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Patent 2525798 Summary

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(12) Patent: (11) CA 2525798
(54) English Title: MITIGATION OF MULTIPATH EFFECTS IN GLOBAL POSITIONING SYSTEM RECEIVERS
(54) French Title: ATTENUATION DES EFFETS DES TRAJETS MULTIPLES DANS LES RECEPTEURS DE SYSTEMES GPS
Status: Expired
Bibliographic Data
(51) International Patent Classification (IPC):
  • G01S 19/22 (2010.01)
(72) Inventors :
  • STANSELL, THOMAS ATLEE JR. (United States of America)
  • HATCH, RONALD RAY (United States of America)
(73) Owners :
  • LEICA GEOSYSTEMS INC. (United States of America)
(71) Applicants :
  • LEICA GEOSYSTEMS INC. (United States of America)
  • HATCH, RONALD RAY (United States of America)
  • HATCH, RONALD RAY (United States of America)
(74) Agent: BORDEN LADNER GERVAIS LLP
(74) Associate agent:
(45) Issued: 2008-08-12
(22) Filed Date: 1996-05-24
(41) Open to Public Inspection: 1996-11-28
Examination requested: 2006-05-09
Availability of licence: N/A
(25) Language of filing: English

Patent Cooperation Treaty (PCT): No

(30) Application Priority Data:
Application No. Country/Territory Date
08/449,215 United States of America 1995-05-24

Abstracts

English Abstract

A technique for minimizing or eliminating the effect of multipath signals in a receiver processing pseudorandom (PRN) code signals, such as in a global positioning system (EPS) receiver. The presence of multipath signals adversely affects both node measurements and carrier phase measurements of received PRN signals. One aspect of the invention provides for improved code tracking in the presence of multipath signals, by sampling the received code with a multipath mitigation window (MMW) (FIG. 25D) that results in a code error function (FIG. 25F) that reduces or eliminates the multipath effects. The MMW, which stay by any of a number of preferred waveforms (FIGS. 35b-358), provides a code error function that varies in opposite directions from zero at a desired tracking point (402), but assumes a nearly zero value when the MMW is advanced from the tracking or synchronization point by more than a small fraction of a code chip. Because of this nearly zero code error value on the early side of the desired tracking paint, delayed multipath signals will have a corresponding code error function that is nearly zero (FIG. 25F) at the desired tracking point of the directly received signals, and the multipath signals will, therefore, have little or no effect on the desired tracking point and on code synchronization. The effects of multipath signals on carrier phase measurements are minimized by sampling the received signals, together with their possible multipath components, before and immediately after code transitions (vectors A and B respectively). The vector relationship of the directly received (D) and multipath (M) signals is such that performing a vector average of the two types of samples (A and B) produces the directly received signal (D) and its correct phase, with many, if not all, of the multipath components (M) eliminated.


French Abstract

Une technique pour réduire ou éliminer les effets des signaux à trajets multiples dans un récepteur traitant des signaux de code de bruits pseudo aléatoires (PRN), p. ex. un récepteur de système de localisation GPS. La présence des signaux à trajets multiples affecte négativement les mesures des nouds et de la phase porteuse des signaux PRN reçus. Un aspect de l'invention prévoit le suivi des codes amélioré en présence des signaux à trajets multiples, par échantillonnage du code reçu avec une fenêtre d'atténuation des trajets multiples (MMW) (FIG. 25D) qui a pour résultat une fonction d'erreur de code (FIG. 25F) qui réduit ou élimine les effets des trajets multiples. La fenêtre d'atténuation des trajets multiples MMW, qui restent proches d'un certain nombre de formes d'ondes préférées (FIGS. 35b-358), propose une fonction d'erreur de code qui varie dans des directions opposées par rapport à zéro à un point tracé souhaité (402), mais suppose une valeur proche du zéro quand le MMW est avancé par rapport au point tracé ou de synchronisation de plus d'une petite fraction de bribe de code. € cause de cette valeur d'erreur de code proche du zéro avant le point tracé souhaité, les signaux à trajets multiples retardés auront une fonction d'erreur de code correspondante qui est proche du zéro (FIG. 25F) au point tracé souhaité des signaux reçus directement, et les signaux à trajets multiples auront par conséquent peu ou pas d'effet sur le point tracé souhaité et sur la synchronisation de code. Les effets des signaux à trajets multiples sur les mesures de phase de porteuse sont réduits par échantillonnage des signaux reçus, ensemble avec leurs composants à trajets multiples possibles, avant et immédiatement après les transitions de code (vecteurs A et B respectivement). La relation vectorielle des signaux reçus directement (D) et à trajets multiples (M) est telle qu'effectuer une moyenne vectorielle des deux types d'échantillons (A et B) produit le signal reçu directement (D) et sa phase correcte, les composants à trajets multiples (M) étant tous ou presque tous éliminés.

Claims

Note: Claims are shown in the official language in which they were submitted.





-71-

CLAIMS:


1. In a receiver for decoding received pseudorandom noise (PRN) encoded
signals, apparatus
for mitigating effects of multipath signals on code tracking of the received
PRN signals, the
apparatus comprising:
a PRN code generator for generating a replica of the PRN code and for
generating related
code multipath mitigation windows (MMWs);
a controllable oscillator, for generating timing signals for the PRN code
generator;
a first correlator, for correlating the received PRN signals with the replica
of the PRN
code, to derive phase error signals used for controlling the oscillator; and
a second correlator, for correlating the received PRN signals with the code
MMWs, and
thereby generating code error signals, in accordance with a code error
function, used to control the
PRN code generator to synchronize the generated PRN code with the received PRN
code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
at code clock positions, each instance of the code MMW being asymmetric about
the desired track
point; and
each instance of the code MMW including a first segment approximately aligned
with the
code clock position and a second segment adjacent to the first segment and
having opposite
polarity and a different width from that of the first segment.


2. Apparatus as defined in claim 1, wherein:
multiple instances of the code MMW collectively have a zero average value.




-72-

3. For use in a receiver for decoding received pseudorandom noise (PRN)
encoded signals, a
method for mitigating effects of multipath signals on code tracking of the
received PRN signals,
the method comprising the steps of:
generating a replica of the PRN code;
generating related code multipath mitigation windows (MMWs);
generating timing signals, in a controllable oscillator, to control the steps
of generating the
replica of the PRN code and the code MMWs;
correlating the received PRN signals with the replica of the PRN code, to
derive phase
error signals used for controlling the oscillator;
correlating the received PRN signals with the code MMWs, and thereby
generating code
error signals, in accordance with a code error function; and
controlling the step of generating the PRN code, to synchronize the generated
PRN code
with the received PRN code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
at code clock positions, each instance of the code MMW being asymmetric about
the desired track
point; and
each instance of the code MMW including a first segment approximately aligned
with the
code clock position and a second segment adjacent to the first segment and
having opposite
polarity and a different width from that of the first segment.


4. A method as defined in claim 3, wherein:
multiple instances of the code MMW collectively have a zero average value.




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5. In a receiver for decoding received pseudorandom noise (PRN) encoded
signals, apparatus
for mitigating effects of multipath signals on code tracking of the received
PRN signals, the
apparatus comprising:
a PRN code generator for generating a replica of the PRN code and for
generating related
code multipath mitigation windows (MMWs);
a controllable oscillator, for generating timing signals for the PRN code
generator;
a first correlator, for correlating the received PRN signals with the replica
of the PRN
code, to derive phase error signals used for controlling the oscillator; and
a second correlator, for correlating the received PRN signals with the code
MMWs, and
thereby generating code error signals, in accordance with a code error
function, used to control the
PRN code generator to synchronize the generated PRN code with the received PRN
code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals; and
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
only at PRN code transitions.


6. In a receiver for decoding received pseudorandom noise (PRN) encoded
signals, apparatus
for mitigating effects of multipath signals on code tracking of the received
PRN signals, the
apparatus comprising:
a PRN code generator for generating a replica of the PRN code and for
generating related
code multipath mitigation windows (MMWs);
a controllable oscillator, for generating timing signals for the PRN code
generator;
a first correlator, for correlating the received PRN signals with the replica
of the PRN
code, to derive phase error signals used for controlling the oscillator; and




-74-

a second correlator, for correlating the received PRN signals with the code
MMWs, and
thereby generating code error signals, in accordance with a code error
function, used to control the
PRN code generator to synchronize the generated PRN code with the received PRN
code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
only at PRN code transitions; and
the code MMW including a central segment of one polarity and two adjacent side

segments of the opposite polarity, each instance of the code MMW being
symmetric about the
desired track point and having an individual average value of zero.


7. In a receiver for decoding received pseudorandom noise (PRN) encoded
signals, apparatus
for mitigating effects of multipath signals on code tracking of the received
PRN signals, the
apparatus comprising:
a PRN code generator for generating a replica of the PRN code and for
generating related
code multipath mitigation windows (MMWs);
a controllable oscillator, for generating timing signals for the PRN code
generator;
a first correlator, for correlating the received PRN signals with the replica
of the PRN
code, to derive phase error signals used for controlling the oscillator; and
a second correlator, for correlating the received PRN signals with the code
MMWs, and
thereby generating code error signals, in accordance with a code error
function, used to control the
PRN code generator to synchronize the generated PRN code with the received PRN
code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;




-75-

the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
at code clock positions; and
the code MMW including a central segment of one polarity and two adjacent side

segments of the opposite polarity, each instance of the code MMW being
symmetric about the
desired track point and having an individual average value of zero.


8. For use in a receiver for decoding received pseudorandom noise (PRN)
encoded signals, a
method for mitigating effects of multipath signals on code tracking of the
received PRN signals,
the method comprising the steps of:
generating a replica of the PRN code;
generating related code multipath mitigation windows (MMWs);
generating timing signals, in a controllable oscillator, to control the steps
of generating the
replica of the PRN code and the code MMWs;
correlating the received PRN signals with the replica of the PRN code, to
derive phase
error signals used for controlling the oscillator;
correlating the received PRN signals with the code MMWs, and thereby
generating code
error signals, in accordance with a code error function; and
controlling the step of generating the PRN code, to synchronize the generated
PRN code
with the received PRN code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals




-76-

will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals; and
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
only at PRN code transitions.


9. For use in a receiver for decoding received pseudorandom noise (PRN)
encoded signals, a
method for mitigating effects of multipath signals on code tracking of the
received PRN signals,
the method comprising the steps of:
generating a replica of the PRN code;
generating related code multipath mitigation windows (MMWs);
generating timing signals, in a controllable oscillator, to control the steps
of generating the
replica of the PRN code and the code MMWs;
correlating the received PRN signals with the replica of the PRN code, to
derive phase
error signals used for controlling the oscillator;
correlating the received PRN signals with the code MMWs, and thereby
generating code
error signals, in accordance with a code error function; and
controlling the step of generating the PRN code, to synchronize the generated
PRN code
with the received PRN code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
only at PRN code transitions; and
the code MMW including a central segment of one polarity and two adjacent side

segments of the opposite polarity, each instance of the code MMW being
symmetric about the
desired track point and having an individual average value of zero.




-77-


10. For use in a receiver for decoding received pseudorandom noise (PRN)
encoded signals, a
method for mitigating effects of multipath signals on code tracking of the
received PRN signals,
the method comprising the steps of:
generating a replica of the PRN code;
generating related code multipath mitigation windows (MMWs);
generating timing signals, in a controllable oscillator, to control the steps
of generating the
replica of the PRN code and the code MMWs;
correlating the received PRN signals with the replica of the PRN code, to
derive phase
error signals used for controlling the oscillator;
correlating the received PRN signals with the code MMWs, and thereby
generating code
error signals, in accordance with a code error function; and
controlling the step of generating the PRN code, to synchronize the generated
PRN code
with the received PRN code signals;
the code error function effectively having a zero value at a desired track
point when the
generated PRN code is synchronized with the received PRN signals and,
immediately on each side
of the tracking point, having a polarity that depends on whether the generated
PRN code is early or
late with respect to the received PRN code;
the shape of the code MMWs generated by the PRN code generator being selected
to
provide a code error function that mitigates the effect of received multipath
signals by providing
an error value that increases rapidly in opposite directions from the track
point, but assumes a
practically zero value when the code MMWs are advanced only a fraction of a
PRN code chip
from the track point, whereby a code error function associated with delayed
multipath code signals
will have a practically zero value near the desired track point and will have
little or no effect on
tracking the received code signals;
the code MMWs being narrow with respect to a PRN code chip and being timed to
occur
at code clock positions; and
the code MMW including a central segment of one polarity and two adjacent side

segments of the opposite polarity, each instance of the code MMW being
symmetric about the
desired track point and having an individual average value of zero.

Description

Note: Descriptions are shown in the official language in which they were submitted.



CA 02525798 1996-05-24
_1_
.MITIGATION OF MULT1PATH EFFECTS
IN GLOBAL POSITIONING SYSTEM RECEIVERS
BACKGROUND OF THE SON
The present invaotion relates generally to Global Positioning System
(°GPS") signal receivers. More particularly, the present invention
relates'to a novel and
improved technique for code synchronization and carrier synchronization within
such
receivers, the technique being highly insensitive to rxeived multipath signal
energy.
Overview of GPS and the code synchronizaBon problem:
The .global positioning system (GPS) may be used for determining the
position of a user on or near the earth, from signals received from multiple
orbiting
satellites. The orbits of the GPS satellites are arranged in multiple planes,
in order that
signals can be received from at least four GPS satellites at a~ selected point
on or near
the earth.
The nature of the signals transmitted from GPS satellites is well known
from the literature, but will be described briefly by way of background. Each
satellite
transmits two spreadum signals in the L baud, known as Ll and L2; with
separate
carrier fitquencies. Two signals are nettled if it is desired to eliminate an
error that
arises due to the refraction of the transmitted signals by the ionosphere.
Each of the
carrier signals is modulated in the satellite by at least one of two
pseudorandom noise
(PRN) codes unique to the satellite. This allows the L-band signals from a
number of
satellites to be individually identified and separated in a receiver. Each
carrier is also
modulated by a slower-varying data signal defining the satellite orbits and
other system
information. One of the PRN codes is referred to as the CIA
(clear/acquisition) code,
while the second is known as the P (precise) code.
In the GPS receiver, the sign$ls corresponding to the known P-code and
CIA code may be generated in the same manner as in the satellite. The Li and
L2
signals from a given satellite are demodulated by aligning the phases, i.e.,
by adjusting


CA 02525798 1996-05-24
-2-
the timing, of the locally-generated codes with those modulated onto the
signals from
that satellite. In order to achieve such phase aunt the locally generated code
replicas
are correlated with the reccivod signals until the resultant output signal
power is
maximized. Since the time at which each particular bit of the pseudorandom
sequence
is transmitted from the satellite is defined, the time of receipt a particular
bit can be used
as a measure of the transit tune or range to the satellite. Again, because the
CIA and P-
codes are unique to each satellite, a specific satellite may be identified
based on the
results of the conrlatior~ be~roen the received signets and the locally-
generated CIA and
P-code replicas.
Each receiver "channel" within the GPS receiver is used to track the
received signal from a parti~lar satellite. A synchronization circuit of each
cannel
provides locally generated code and carrier replicas, which are synchronous
with each
other. During acquisition of the code phase within a particular channel, the
received
satelliroe signal is correlated with a discriminatio~a pattcra comprised of
some combination
of "early" and "late" versions . of the channel's locally generated code
replica. The
resultant early-minus-late correlation signals are accumulated and prod to
provide
feedback signals to control code and carrier synchronization.
Historically, the phase difference bin the early and late code versions
generated within the GPS receiver has been equivalern to one code chip (i.e_,
1.0 chip
correlator spacing). A number of factors have contributed to widespread use of
early-
mipus-late discrimination patterns relying upon 1.0 chip correlator spacing.
For example,
in analog GPS receivers this corrclator spacing minimized the required
hardware. Also,
early GPS receivers typically utilized P-code (rather than C/A code) tracking,
in which
synchznnization is established' with relatively short-duration P-code chips.
As a
consequence, it was believed that the use of narrow correlator spacings, i.e.,
less than
1 chip, could result in loss of code lock due to Doppler and other
disturbances. Such
narrower spacings also.increase the requishe speed of P-code signal processing
circuitry,
which is of necessity already. relatively fast due to the high P-code chip
rate.
Rx~ly, digital GPS receivers relying. upon CIA code tracking have been
, . . developed: which employ : correlator .spacings of less ~ than one ~ CIA
code chip. Such


CA 02525798 1996-05-24
-3-
narrow correlator spacing is believed to reduce code-tradking error by
increasing the
correlation between the "early" and "late" noise contributions, which tend to
cancel in
the early-mimes-late code d'~criminator. Although discrimination patterns
characterized
by narrow early-mita~s-late oorrelator ~ spacing afford improved C/A code
tracldn~g, such
early-miss-late discrimination are still relatively sensitive to received
multipath
signal energy. Multipath signal energy arises due to reflections of the
satellite signals
from objects within the vicar of the GPS receiver antenna. Since the mnItipath
signals
are processed together with the GPS signal directly received from the
satellite, code and
carver tracking can be signific~tly oonnpted by multipath errors.
Since multipath energy is always delayed relative to directly received GPS
signals, multipath tends to corrupt the locally generated "late" version of a
code
signal rather than the early version. As a consequence, GPS rxeivers have been
developed which utilize an "early-minus-prompt" discrimination pattern in the
code
cornlation process. By forming the discrimination pattern basedYon,the
difference, of the
early and prompt, or "on-time", code replicas, it has been possible to
somewhat reduce
the deleterious efforts of multlpath. However, it is believed that
substantially improved
performance could be obtained through the use of discrimination patterns even
less
susceptible to adverse multipath effects.
Accordingly, it is an object of the present invention to provide a method
of code synchronization which is even less sensitive to the effects of
multipath than are
techniques predicated on the use of "early-minus prompt" discrimination
patterns.
More detailed background - GPS fundamentals:
(a) Spread spect~sort signal, fitndomentals:
Although there are several ways to create a spread spectrum signal, the
one most often u~d is "direct spreading" with a pseudorandom code, which is
the
technique used in GPS. (Pseudorandom codes are often called PN or PItN codes,
meaning pscudorandom noise codes.) The must frequernly used pseudorandom code
is
a binary sequence, i.e., the signal has only two states, e.g., +1 or zero. It
is equally
valid anti often useful to define the two states as + 1 and -1. Each of these
notations will


CA 02525798 1996-05-24
-4-
be used in this discussion, depending on flaw eircumstanc;e.
Tire term "psdudorandam" refers to the fact that these codes appear to be
a randanr sequence of + 1's and -1's, but that the code is not truly random
and repeats
identically over and over. The two key characteristics of a pseudorandom code
are its
clock rate and its code length. The clock rate defines how oRen the code can
change
state (e.g., from +1 to -1 or firm -1 to +1), and the code length defia~ how
many
bits, or chips, make up the code and, therefore, how often it repeats at a
given clock
rate. The GPs CIA code is clociaod at 1.023 MHz, it has 1,023 bits, so it
repeats 1,000
times per second. . .
(b) Autocornelatfon,~Cnction:
The autocon~elation fimction is a useful way to envision the properties of
a pseudorandom code. Table I iaust<ates,the autoeorrelation function with a IS-
bit code,
(1I l IOOOI0011010), .:w~~ ~ ~ ~e desirable. properties as any maximal length
pseudorandom code.


CA 02525798 1996-05-24
-$-
Table L- Illustration of Code Correlation Funetioa w
lllloooloollololluoooloollolo . ~ ions ofReferenoe code


111100010011010 +15 Agre~ts, antooorrelation = i


111100010011010 - 1 Agrxmenta, antocotrelation = -I/IS


111100010011010 - 1 Agrxmmts, aatoc~elation a -1/15


111100010011010 - 1 Ag~enta, autocatrWaiion a -1/15


111100010011o1o - 1 Agreemarts, antooomeIuion = -1/15


iiiioooio011oio - i Agr~neats, antocornlation =~-1/15


111100010011010 - 1 ~Agrxmenta, autocornlation = -1/15


111100010011010 - 1 Agreemarts, antooorniation = -1/15


111100010011010 - 1 Ants, antocorrelation = -1/15


111100010011010 - i Agreemeata, autococrelation =
-1115


111100010011010 - 1 Agreem~tS, autocon~lation a -1/IS


IS 111100010011010 - 1 Agrxm~ts, autocornlation =~-I/IS


11110001o011010 - 1 Agts, antooorrelation = -i/15


111100010011010 - 1 Acts, autocornlation = -i/15


111100010011010 - 1 Agnxmeats, autooorrelation = -i/15


111100010011010 +15 A,gc~eemmts, rutocarnlation =
I


The code states are shown as 0 and 1 for illustration convenience. On the top
Line, the
15-bit code is repeated twice. On the second Line the 15 bit code is in
perfect alignment
with the first code sequence in the top line. Every bit in the second line
agrees with the
corresponding bit in the line above it. Therefore, with 15 agrxments out of 15
possibilities, the autocorrelation has a value of 1, meaning 10096
correlation. The Last
line in the table is seen to be perfectly aligned with the second code
sequence in the top
Line. It also has 15 out of 15 agreements and an autocorrelation value of 1.
The bits in
every line between the second and the Last agree with the corresponding bits
in the top
line only 5 times and disagree 6 times, for a net count of one disagreement.
Therefore,
a particularly useful characteristic of these codes is that a code shin of
only one bit from
perfect alignment causes the autocorrelation function to drop from +1 to -1/N,
where


CA 02525798 1996-05-24
-6-
N is the munber of bits in the code. For a code length of 1,023 bits, the
autocorrciation
function drops from +1 at perfect aIigmnent to -1/1023 with a one bit shift.
For most
practical purposes we can consider the autoeorrelation function to be zero
whenever
codes are misaligaed by one or more bits.
FIGS. 7A-7G show the same process as Table I. In this case, however,
each code chip in FIGS. 7A 7F is drawn as a horizontal line with a width of
one clock
period. The 15-chip code repetition period also is designated. FIG. 7A depicts
a
. continuing code sequence; FIG. 7B shows a replica of one code repetition
period in
perfect alignment with the code of FIG. 7A; and FIGS. 7C-7F show the same code
sequence advanced in time by 34 chip, tfs chip, ~ chip anti one chip,
respectively.
Finally, FIG. 7G plots the autocornelation function with respxt to time
displacement,
measured is chips. The purpose of this diagram is to .illustrate that. the
autocorrelation
function has. a value of 1 at perfect alignment and drops linearly with
increasing code
displacement to the -l/N value with a displacement of one bit or more. The
distance
IS between autocorrelation peaks is the code repetition period, and the total
width of the
sutocornelation "pulse" is two chips or code clock periods.
GPS satellites tratmnit two codes, the CIA code and the P code. The CIA
code has a clock period of about 977.5 nanoseconds and a code repetition
period of
O.OOI second. The P code has a clock period of about 97.75 nanoseconds and a
code
repetition period of one week.
(c) Spread Spectnan Signal:
A diroct sequence spread spectrum signal is normally created by biphase
modulating a narrowband signal with a pseudvrandom code, as shown in FIGS. 8
and
9A-9C. FIG. 8 shows a biphase modulator 300, which modulates a carrier
t~eceived on
line 302 with a code signal received on Iine 304, outputting the modulated
carrier on Iine
306. The cattier is depicted in FIG. 9A, the code in FIG. 9B and the
modulated, spread-
spec~nun output signal in FIG. 9C. The carrier and the code are not ~:essarily
drawn
to the same scale and are shown only for purposes of illustration. When, the
code is in
.30 ~ the +1 state, .the carrier signal is not inverted. When the code is in
the -1 state, the


CA 02525798 1996-05-24
_7_
CarIlCr Signal IS lIIVCTOed.
The spectral :result of this process ~ is shown in FIG. ~ 10. The original
carrier firquency at Fo is suppt, and the total signal energy is spread over a
bandwidth arocmd Fo of plus and minus the code clock' frequency to first
nulls. Spectral
components outside this bandwidth also are created, but at ever lower
amplitude with
frequency separation.
FIG. 10 also shows a line structure within the spread spamvm envelope.
These spectral lips occur at the code ion frequency. The GPS Ll carrier
frequency of 1575.42 ~ carries both a CIA code and a P (or ~ code. The CIA
code
energy is spread over a bandwidth of t 1.023 MHz around L1, and the signal has
spectral components every 1 kHz, which is the CIA code repetition frequency.
The
P code is spread over a bandwidth 110.23 MHz around Ll, and the spxtral
components
are at an undetectable one cycle per week, which is the P code repetition
frequency.
(d) GPS Sfgnal acre:
FIG. 11 is a highly simplified block diagram of a GPS satellite. In light
of the preceding sections, this diagram eicplains the nature of the GPS
signals. FIG. 1 l
shows that there are five key functions of the satellite, all driven by a
single atomic
clock 310 with a fiyue~r of 10.23 MHz. The Li easier frequency of 1575.42 MHz
is obtained by multiplying 10.23 MHz by 154, as indicated by frequency
multiplier 312.
The L2 carrier fi~aquency of 1227.6 MHz is ~ 120 times the clock and is
obtained through
another frequency multiplier 314. The P code rate is 10.23 Mliz and is
obtained directly
fmm tlye clock 310. The CIA code rate is one tenth the clock frequency and is
obtained
through a frequency divider 316. Even the 50 bit per second data rate from the
memory
is derived from the atomic clock 310, through another frequency divider 318.
It can be
said that all of these signals are coherent because they are derived from a
single clock.
Each GPS satellite normally transmits three navigation signals. One is on
the L2 cezrier signal and is based on the P code fmm a P code generator 322,
and two
are on the Li carrier signal and are based on the P code from the P code
generator and
the CIA code from a CIA code generator 324, respectively. Tv accomplish this,
the Ll


CA 02525798 1996-05-24
_$_
carrier signal is first dividod into two components that are in phase
quadrature, as
indicated at 320. Each of these components is individually modulated with
navigation
signals before being combined, amplified, and transmitted.
A memory 326 produces data at 50 bits per second. These data bits are
combined in EXCLUSIVE OR gates 328 and 330, respectively, with the ClA code
and
with the P code. The effxt is to invert or not to invert the polarity of the
code bits
depending on whether the current data bit is a uro or a one. The combined C/A
code
with data bits is used to biphase modulate one of the two Ll components,
creating a
spread spectrum signal as described previously. The combined P code with data
bits is
used to bi-phase modulate the other Li component and the L2 carrier signal.
(e) GPS Anti Spoofing:
The U.S. Depardneat of Defense, which operates the Global Positioning
System, wants to prevent an enemy from spoofing their GPS receivers by
transmitting
a false signal which could be acceptod as real. This is accomplished in the
GPS satellites
by encrypting the P code before it is transmitted. The process is called anti-
spoofing
(AS), and the resultant code is called the Y code. As described in U.S. Patent
No.
4,972,431, is~ed is the name of Richard G. IGeegaa, the Y code is an EXCLUSIVE
OR
combination of the 10.23 MHz P code and as encryption code which is clocked at
approximately 500 kHz.
Purpose and Advaatages of tracking Spread Spect:~n Signals:
FIG. 12 and FIGS. f 3A aad I3B illustrate a basic spread spectrum signal
trackiag concept. "Tracking," in the context of this invention, is synonymous
with
synchronization. The spread spectrum signal (FIG. 13A) being received by an
antenna
332 is the product of a narrowband signal S and the pseudorandom code C. This
signal
plus the incoming wideband noise N are biphase modulated, as indicated at 334
with a
locally generatod version of the same code C. When the time phase of the
received code
ant! the locally generated code are accurately aligned, the biphase modulation
originally
applied,to<the signal is c~xlec~ by again modulating the signal with the same
code. The


CA 02525798 1996-05-24
-9-
result is the original narrowband signal S beforc'~it~ was initially
modulated. The
narrowband signal S now can be filtered by as appropriately narrow filter 336,
which
allows the entire ,signal through but rejxts most of the wideband noise, as
indicated in
FIG. 13B.
Note that eanoellation of the biphase modulation does not occur unless the
two codes are identically the same and are accurately alignod, meaning that
the
autocorrWation function of the two codes must be near one. This characteristic
explains
why it is possible for all GPS satcllitGS to transmit on the same Ll and L2
frequencies.
Fraeh satellite uses a different CIA and P code. Therefore, a receiver, or one
channel of
a mufti-channel receiver, can selax a single GPS satellite signal by using the
appropriate
pseudora~om code for that particular satellite. This process is callod Code
Division
Multiple Acxess (CDMA).
To achieve the required time phase alignment of the locally generated code
with the received code, a code search and tracking function is required. An
important
~ ~ benefit of the code ~ tracking ~ function ~ is to locally measure the time
of arrival of the
received code time phase.. This is the process used to make pseudotnnge
measurements
on GPS signals. (Ignoring ionospheric and tropospheric refraction effects, if
the time of
transmission and time of reocp~tion of a GPS signal were known precisely, the
difference
between these limas multiplied by the speed of light would give an accurate
measure of
the distance between the satellite and the receiver. The term pseudorange is
used to
designate the distance calculated by multiplying the speed of light by the
difference
between the locally deoermined receive time arid the GPS transmit time. This
calculated
value contains a bias due to the local clock error, hence the term
pseudorange.
Simultaneous pseudorange measut~ements on multiple satellites each contain the
same
bias, which is rtmoved as part of the navigation ealcxtlation.)
An important benefit of spread spearum signal processing is that the effect
of narrowband interfering signals is greatly reduced. When a spread spectrum
communication signal is ~despread" at a receiver to recover the communication
signal
in narrowband form, any interfering narmwband signal is simultaneously spread
over a
wider bandwidth and can be largely removed by filtering.


CA 02525798 1996-05-24
-10-
Digital Tracking Methods:
FIG. 14 is a simplified block diagram of a spread spectrum receiver, using
digital signal proo~g ~miques, which is typical of modern GPS receivers.
Although
this receiver is conventional, one needs to understand its function and
operation in order
~o appreciate the specific problems addressed by the present invention. In the
receiver,
a sin4gle antenna 340 collects all available signals, which are processed
through a filter
342, an amplifer 344 and, optionally, a dawnconverter 346 to obtain a lower IF
frequency for further processing. Next, the composite signal is digitally
sampled, as
indicated by the sampler 348 and clock 350.
A number of.di,~al sampling techniques can be used, of which there are
three Iaey cW aeteristics. These are: (I) sampling rate, (2) sample
quantification, and (3)
single or dual phase sampling.
The sampling rate must be chosen to adequately reproduce the signal in
digital form (Nyquist rate) without too much loss of signal-to-noise ratio.and
without
folding out-of band noise into the signal bandwidth (a phenomenon known as
aliasing).
Signal sampling also often performs a frequency dowaconversion of the sampl~l
signal.
If the carrier frequency (whether present or suppressed) of the signal being
sampled has
a frequency of (N + E) cycles per sample clock period, where a is a fraction
between
t0.5, the carrier frequency of the sampled signal will be 8F8, where FS is the
sampling
frequency. For example, if 8 were 0.25, the phase of tray sampled signal would
rotate
by .one quarter of a cycle between samples. The nominal value of 0.25 is not
required,
but it is typical because of design eonstrairns. A smaller fraction reduces
the sampled
carrier frequency, which must be high enough to support the full spread
spectrum
bandwidth without folding at zero frequtncy. A larger fraction raises the
sampled carrier
frequency, and with it the upper edge of the spread speetirum signal, which
cannot
exceed. the sampling frequency without abasing:
Digital samples quantify the composite signal amplitude. The least
complex sample is a one-bit qnautification of the composite signal. At each
sample
clock,, the sampler only reports ,whether the signal is positive or negative.
More complex
digital samplers quantify .the signal amplitude at each sample clock into
three or more


CA 02525798 1996-05-24
-11-
levels. Compat~ed with binary . sampling, ~ -higher:. resolution ' sampling' '
improves
signal-to-noise ratio and permits certain types of interfering signals to be
attenuated. Jn
addition to a more complex signal sampling circuit, mufti-level sampling
requires use of
an automatic gain control (AGC), not shown, to adjust the signal amplitude to
best match
the available quantification levels. (Alternatively, the quantification levels
can be adjusted
to best match the input signal level.)
in processing digital samples, it is necessary to form two signal
components, usually called I and Q for yphase and suadrature components. These
components are in phase quadrature with each other, as are tls: sine and the
cosine of
an angle. These I and Q eon can be coed directly by the sampler 348, or they
can be formed 3n later processing. The latter approach is shown in FIG. 14.
FIG. i4 shows only one channel of a mufti-cha~mel receiver. Identically
the same signal samples are fed to every channel, so there is no relative time
delay
betvvecn channels. As also shown, each channel includes a code generator (PRN
coder
I5 350) and a numerically controlled oscillator (NCO 352). The components
above these
central elements in the figure are used to track the phase of the sampled
carrier
firquency, and the components below are used to acquire and track the
pseudorandom
code. These processes are de~ribod in the following sections. Briefly, pha~
tracking
is aax~mplished using a Costar carrier tta~x 354, which controls the NCO 352
to effect
phase tracking with the received crier. Code tracking is accomplished with a
code
tracker 356, which controls the code generator 350 to effect synchronization
with the
received code signals.
Carrier Phase Tracking:
To begin this description, it is assumed that the code and carrier phase
tracking loops in FIG. 14 are synchronized and running properly. This means
that the
punctual code coming from the pltN Coder 350 is accurately aligned with the
same code
on the rxeived signal being sampled- The word "puncwal" means that the code is
aligned as well as possible, rather than having an intentional off~t. As a
result,
correlating the sampled signal with the puncxual code produces a narmwband
signal


CA 02525798 1996-05-24
-12-
which is biphase modulated only by the data bits. In the case of GPS, the data
bits
modulate the narrowband carrier at a rate of 50 bits per second.
When the numerically controlled oscillator (NCO 352) is phase locked to
the incoming signal, it creates taro outputs, I Reference and Q Reference,.
which are in
phase quadrature (have a 90-degree phase shift relative to each other) and
have precisely
the same frequency as the downoonvertod, inaxmediate carrier frequency of the
sampled
signal. These two signals are each correlated (as indicated at 358 and 360)
with the
"output of a puach~al code eorrelator 362 to produce I Pcmctual and Q Punctual
baseband
signal components, which are input both to the Costar carrier tracker 354 and
to the
code tracker 356.
With vector notations in mind, FIGS. 15A and 15B illustrate the I aad Q
correlation procxss taking placx in the raxiver of FIG. 14. FIG. i5A shows the
I and
Q correlators, each with its own reference signal. Between these two reference
signals
in figure, is the input signal. Note that the two reference signals are in
phase quadrature
and that the input signal is precisely in phase with. the upper reference
signal. Each
correlator multiplies one of 'rts inputs by the other. The output of the I
correlator 358 is
the product of the sine function_times another perfectly aligned sine
function. From
trigonometry,
sin=x = 'h [i - cos (2x)]
Thus the I correlator 358 output is a constant value of + lk plus a cosine
functioa at
double the input frequency. The purpose of these eorrelators 3S8 and 360 is to
produce
very slowly varying signals, which can be used to control the tracking'
functions.
Therefore, the oorrelabor output signals are passed through a low pass filters
364 and 366
m obtain the slowly varying signals and to reject the high frequency
components. Thus,
the output of the I correlator 358 is represented by a stationary, non-
rotating, positive
vector 368, which is -proportional ~ to the incoming signal strength.
The output of the Q cornelator is: the product of the sine function times a
cosine function of the. same frequency. From trigonometry,
sin x cos x ~ = sin 2x
Thus, .the Q cotrelator .outputlhas only a :high frequency component. When
this is


CA 02525798 1996-05-24
-13-
low~ass filb~t~ed, the output is zero; which is rcpirsented by a horizontal
vector 370 with
its tip at the xem amplitude position.
A more general trigonometric expression of such products is
sin (f.~t + w) sin (tot) _ ~ [cos (w) ~ - cos (Zfat + w)]
sin (?at + w) cos (fit) _ ~ls [sin (2~t + w) + sin (w)],
where E~ is the phase rate (2uF) and w is the signal phase offset
This shows that the product of two sinusoids with the same frequency but
with different phase offsets results in a high frequency term at twice the
input frequency
and a low fn:quency term with its amplitude proportional to the cue of the
phase
difference between the two signals. The low pass filter eliminates the high
fitquency
term, leaving only the low frequency term. Therefore, if the input signal
shifts in phase
relative to the two reference signals, the I and Q output vectors will rotate,
decreasing
the I value and causing a positive or negatrve Q value, depending on the
direction of the
phase shill.
FIG. 15B illustrates what happens when the phase of the input signal is
inverted due to the data modulation. Specifically, both the I and ~ Q vectors
flip to the
opposite direction, representing a I80-degree phase shift of the input signal.
Coonal phase-locked loops use the Q vector as an error signal in a
evntrol loop which locks the refemnee signal to the phase of the signal being
tracked.
When the loop is correctly locked, the Q vector output is at zero. If the
phase of the
input signal changes relative to the reference signal, the Q vector rotates
counterclock
wise or clockwise, depending on the direction of the phase shin, producing a
positive
or a negative error wltage which drives tls= loop to eliminate the phase
error. However,
if the input signal is biphase modulated by data bits, the Q error signal also
is
modulated. A positive error voltage during a +1 data bit becomes an equal
negative
error voltage during a -I data bit. As a result, the Q signal cannot be used
directly as
an error signal to phase track biphase modulated signals.
A solution to this pmble~m is shown in FIGS. 16A and 16B. The polarity
of the I signal is detected, as indicated diagrammatically at 368, and used to
rectify the
Q signal. As a result, a positive Q error voltage during a +1 data bit and a
negative Q


CA 02525798 1996-05-24
-14-
error voltage during a -1 data bit both produce a positive output error
voltage. This
configuration is called a Costas loop, labeled as the Costas carrier tracker
354 in FIG.
14, and it pamits phase loclaed tracking of biphase modulated signals. One
consequence
of the Costas loop is that it will lock and track successfully at either of
two cazrier phase
values which are Z 80 degrees apart. At one phase the I vector is positive for
+ 1 data
bits, and at the other the I vector is ~gative for +1 data bits. Data content
rather than
I voctor polarity must be used to distinguish +I bits from -I bits.
FIGS. 16A and 16B also show that the low pass filtering process is
implemented with an integrate and dump (I/D) function 370, 372. The output of
this
function is the integral of the input signal, which is equivalent to a good
low pass filter.
The integrator is reset to zero, or dumped, upon command. For example, the I
irnegrator
is reset at the beginning of each new data bit. .As a result, the I output at
the end of each
data bit provides the best estimate of whether the data bit was i or 0. This
data bit
demodulation process provides the message data from the Costas carrier tracker
354 of
FIG. 14.
If the Q value were needed only once per data bit, it would be best to
integrate both the I and Q signals for as entire data bit period before
rectifying the Q
signal with the polarity of the I signal. If the bandwidth of the phase-locked
loop _ requires
a Q input more often than the data rate, the Q integrator is read and dumped
at the
necessary rate, but the I inoegration cues over the ~ bit interval, improving
the
I output signal to-noise-ratio as the i~egration time increases.
The Costas carrier tracker 354 of FIG. 14 controls the numerically
controlled oscillator (NCO 352) so that the I and Q reference signals are
phase locked
to the incoming carrier signal. Thus, the phase of the NCO signal accurately
represents
the phase of the received,carrier signal and can be measured and compared with
the
phase of other satellite signals at;dis~ time marks. This is the basis for
high precision
navigation or positioning with carrier phase signals.


CA 02525798 1996-05-24
-I$-
Code Tracking:
(a) Early minus halt Carat Trackfng:
Because the code and carrier signals from the satellite are coherent, the
NCO 352 in FIG. 14 also is able to clock the PRN code generator 350 at very
nearly
the corrxt rate. Alt>mugh carries aided code tracking is not mandatory, it
does improve
code tracking aaxnucy. There is a small error in the aiding rate due to the
effect of the
earth's ionosphere on a GPS signal. Being a dispezaive medium, the ionosphere
advances
the phase of the carrier signal and retards the time (phase) of the code
modulation.
Therefore, a code tracking flinetion is not only to find the proper code phase
initially but also to track out the slow diverganoe between the code phase and
the carrier
phase.
In the receiver example of FIG. 14, code tracking is achieved by first
correlating the signal samples ~rith an early minors-talc (&L) version of the
local code,
as indicated at 380. The output of this correlation step is then correlated
with both
carrier phase reference signals, I Reference and Q Reference, as indicated at
382 and
384, to produce vectors I E.L and QE_~. Note that I Punctual (I P ) and IE_L
are identical
except for the difference caused by the effect of first correlating with an E-
L code rather
than with a punctual code. The same can be said for QP and QE_L. Therefore,
the next
step is to examine the effect of E-L correlation on the vectors shown in FIGS.
15A and
15B.
FIG. 17 (A-)~ illustrates eight code segments. FIG. 17A shows a segment
of received code. FIG. 17B is a properly aligned local code segment, such as
the
punctual cede of FIG. 14. As shown before, the product of the received code
with a
properly aligned punctual code rrs~ults in a narrowband signal with maximum
ampliwde.
This relationship is represented by the peak of the autocornelation function
of FIG. 7G.
FIG. 17C. labeled early code, is the same as the second, except that it has
been shined early in time phase by a half chip. Similarly, FIG. 17D, labeled
late code,
has been shifted late by a half chip.
FIG. 17E, labeled early minus late, is the early segment minus the late
segment, which could be used as the E-L Code of FIG. I4. Note first that the E-
L code


CA 02525798 1996-05-24
-16-
has three amplitude levels rather than just two, i.e., +1, 0, and -1. With
reference to
FIG. 14, when the E-L code is at zero, no signal samples pass through the E-L
code
correlator 380. Next, note that the E-L code has a zero value whenever the
punctual
code does ~ transition, e.g., at the time of a code clock where no transition
occurs.
The illustrated FrL code is at +1 wl~ever the puacwal code transitions from -1
to +1,
and it is at -1 whenever the punctual code transitions from + 1 to -1.
In the case illustrated by FIG. 17, the E-L code is seen to be a series of
windows centered on punctual code transitions, with the polarity of the window
determined by the direction of the corresponding transition. Note that the
window can
be formed either by differencing two separate correIators, one referencxd with
a
continuous early code and one with a continuous late code, or by a single
correlator
referenced with an B-L code window.
FIG. 17F, labeled punctual E L product, is the product of the received
code with the E-L code. The prodaet is, of course, at zero whenever the E-L
code is
zero. Elsewhere, the product has equal durations of positive and negative
values, so the
average value of the product segment is zero.
FIG. 17G, labeled delayed early minus late, is a delayed version of the
H-L code, and FIO~. 17H, labeled delayed product, is the product of the
received code
and the delayed E L code. In this example, the duration of positive and
negative product
values are not equal, so the average value of this segment is positive.
With r~pea to FIG. 14, it should be clear that the average amplitude of
both I~ and ~.,. will be zero when the punctual code is properly aligned with
the
rxeived code, because with that alig~nt the product of the signal with the E-L
code
averages to zero. Hog, the I~ and QB,.~ vectors grow larger if the perfect
alignment
is disturbed, Furthermore, the polarity of these vectors is reversed if the
misalignment
is a delay rather than an advance. A,s a result, these vectors are used as an
error signal
by the code traciaer 356. The code tracker 356 adjusts the time phase of the
PRN coder
350 to minimize the code error function and thus achieve proper alignment with
the
received code. Because . of this, the time ~ phase of the PRN roller 350
accurately
- represents the time phased ofE the .received code ~ signal, . and it can be
measured and


CA 02525798 1996-05-24
-17-
compared with the time phase of other satellite signals at discrete time
marks. This is
the basis for navigation and positioning with code mtasurcments.
Note that I Punc~al (I r), Q Pnacrital (Qr), and the message data (D) bit
signals also enter the code tirachet 356 of FIG. 14. The first purpose of this
is to rectify
the I&L and Q&L signals to remove the phase reversal effect of data bit
modulation on
these signals. When the Costar loop is property locked, both Qr and Q&L remain
at zero,
so that only I~ provides a useful signal for the code error function. In this
case, Ir is
rectified by the data bit value D, i.e., (Ir)(D), so the code error function
is ~t affected
by the data modulation. However, it is often nxessary to search for proper
code
before the Costar loop has loclaed. In this case the I and Q vectors arc
rotating
at the frequency diffennoe between the nxeived carrier signal and the NCO
(352)
frequency. By summing (Ir)( I~ and (QrXQsa,). the i~vlt is a scalar value,
which can
be used as a code error function before the Costar loop lock's to the carrier
signal.
FIGS. 18A-F provide a convenient way to visualize the error function
created by the product of the received code a~ the E-L code. FIG. 18A shows a
received code segment. FIG. I8B shows a single E-L window centered on the
downward
code transition of FIG. IBA. The received code signal that is allowed through
the
window is positive during the first half of the window and negative during the
second
half, for an average value of zero. The arrow in the center of the window
points
downward toward the code error function plotted in FIG. 18F, which has zero
value at
that point. FIGS. 18C, 18D and 18E show three other earlier positions of the E-
L
window relative to the received code, these being one half chip advanced (FIG.
18C),
one full chip advanced (FIG. 18D), and 1.5 chip advanced (FIG. 18E). At the
half chip
advanced position, the portion of the received code allowed through the window
is
always positive. This positive value is inverted by the -1 state of the
window, so at that
position the code error function (shown in FIG. 18F) has its maximum negative
value.
The explanation for the value of the code error function at the full chip
and at the 1.5 chip advanced E-L window is not as obvious as for the other two
positions
considered above. For simplicity, FIG. 18A shows only one small portion of a
code
which, in its entirety, has at least hundreds of transitions. For example, the
GPS CIA


CA 02525798 1996-05-24
-18-
code of 1023 bits has 512 transitions. Therefore, because of the decorrelation
properties
of PRN codes, the probability of a transition occurring, or not occurring, at
any code
clock pulse essentially is 5096. FIGS. 18A-18E illustrate this by showing that
the
received code could be either positive or negative one chip from the
transition being
considered. As a result, by advancing the E-L window by one full chip, it will
be
centered on another transition half of the time and on no transition, in this
example
remaining positive, the other half. Thus, the average result is a negative
value one-half
as large as the maximum negative value of the code error function. The 1.5
chip
advaneod window has an equal probability .of seeing +1 or -1, for an average
value of
zero. FIG. 18F therefore illustrates how the code error function is formed.
The code tracking loop seanhes for the raxived signal by testing different
time phase values, usually stepping one-half chip at a time. When the local
code is less
than one chip from alignment with the received code, signal energy will be
detected by
the Costas loop and a code error function will be detected by the code tracker
356. The
code tracking function drives. the code in one direction for a positive error
and in the
other direction for a negative error. The objective is to seek and to maintain
an error
value of zero at the. center. of the error function, which represents proper
alignment of
the two codes.
(b) L,~ect of Multlpath on Code Tracking:
It would be ideal if the only signals reaching the receiver's antenna came
directly from the signal source, e.g., GPS satellites. Unfortunately, signals
come not
only directly but also indirectly by being reflected from local objects. FIG.
19 is a
simplified, two-dimensional view of this n:ality. Because the orbit of a GPS
satellite is
more than 11,000 miles above the earth, its signals appear to arrive at
exactly the same
angle at every location within a local area. This is why FIG. 19 shows the
incoming
signals from one satellite as_parallel lines. Because there are many reflected
signals, and
only one direct signal, the farm multipath interference is used. In FIG. 19,
only two
multipath signals are illustrated, one from a low angle and one from a high
angle. It is
evident that every reflected signal must travel a greater distance to the
receiving antenna


CA 02525798 1996-05-24
-19-
than the direct signal.
Att>mugh normally there are maqy reflecbod sig~OaLS, the explanation of the
multipath effect is simplified by considering only one reflected signal at a
time. By the
principle of superposition, the composite effect of many multipath signals can
be
obtained by summing the individual effect of each one.
To evaluate the effect, FIGS. 20A 20C show the received code and the
E-L code error function of FIG. 18, but it also illustrates the effect of one
multipath
signal. There are three key characteristics of such a reflected signal. First,
bxausc it
mast travel a longer With than tlx direct signal, it always is delayed
relative to the direct
signal. Second, because of the longer path, the phase of its carrier frequency
is shied
relative to that of the dirax signal, often by many cycles. l3ocause the
wavelength of the
GPS Ll signal is approximately 19 cxatimeters, . every centimeter of extra
path length
causes about 19 degrees of phase shift. With such high sensitivity of phase
angle to path
length, it is evident that the relative phase of a reflected signal has a
uniform probability
of being any value between zem and 360 degrees. Even so, when a GPS receiving
antenna is stationary, the pha~ did between the direct signal and a signal
reflected .
fmm a stationary object can be quite stable. Depending on the geometry, the
path length
diffeiunee can change very slowly, becxtuse t'sPS satellites are far away and
their angular
motion therefore is slow. Finally, and fordmabely, it usually is teas that the
reflectod
signal ruches the antenna with a lower signal level than the direct signal due
to losses
and polarity reversals experienced when the signal is reflected. The code
error function
for the directly received code is plotted at 390 ,in FIG. 20C, and is
identical with the
code error function of FIG. 18F.
For illustration purposes, the received multipath code of FIG. 20B is
shown at half the ampliw~de of the direct sig~t of FIG. ZOA, with a delay of
one quarter
chip, and whh'opposite polarity due to an assumed 180 degree carrier phase
difference
relative to the direct. signal. Given this multipath signal as an example,
there is a
corresponding received multipath code error fltttetion, shown at 392 in FIG.
20C.
Relative to the direct code error function, the multipath code error function
has half the
amplitude, it is delayed by one quarter chip, and it has opposite polarity.
FIG. 20C also


CA 02525798 1996-05-24
-20-
shows the sum of these two error functions, labeled error sum, at 396. If the
relative
carrier phase were zero rather than 180 degrees, the received mnltipath code
error
function would lx inverted, and the corresponding composite result is shown by
the error
function labeled error difference, at 398, which is .the directly received
code error
function minus the received multipath code error function.
The code tracking function cannot discriminate between the direct error
function and the multipath error function. Therefore, it adjusts the code time
phase to
bring the sum of the error fito a value of zero. FIG. 20C also shows the
location
of the track point with the illustrated multipath signal (400), without a
multipath signal
(402). and with the non invertiod multipath signal (404). These track points
are labeled
track point with error sum, punctual track poinx without mnltipath, and track
point with
error difference, respeLtively. Note that even though the multipath signals
always arrive
later than the direct signal; the track point can be advanced as well as
delayed by
multipath.
An important observation from FIG. 20C is that the track point advance
always is greater than the track point delay, i.e., the effect is asymmetric
about the
multipath-free track point 402. It is often thought that motion of the
receiving antenna
relative to reflecting objects eliminates the effect of multipath from these
objects. The
reason is that the carrier phase d~ between the direct and the reflected
signals
changes so rapidly with motion of the receiving anbenfla that a narrowband
code tracking
loop ~ will not follow the rapid excursions. However, bocanse of the
asyaAmetric effect,
even ~ rapidly changing multipath signals will induce an early bias in the
track point.
Basic Approaches to Code Moltlpath ion:
Over the years, a number of arultipath mitigation techniques have been
developed. Those used for GP5 fall into three broad categories. The first is
filtering, in
which earlier pha~ measuremems are used to define code dynamics very
precisely,
which, in turn, allows the code measurements to be smoothed with a long time
constant
filter to remove much of the multipath noise. A second technique employs
additional
correlators in each cli~nnel toy characterize the shape of the autocorrelation
function and


CA 02525798 1996-05-24
21-
thereby draw conclusions about the effect of the multipath error. A third
approach is to
modify the shape of the txacldng window to~mi~e the of multipath signals. The
earliest form of this third technique is die. narrow correlator.
(a) Narrow comelator.
An important multipath mitigation technique is the narrow correlator. This
concept is. illustrated by FIGS. 21A 21F. As in FIGS. 18A-18F, the error
function is
formed by means of an early-minus-late (><L) window oenbered on code
transitions, with
its polarity determined by the direcrion of the transition. In this case,
however, the
window is quite narrow relative to the period of die code chip. As a result,
the
maximum amplitude of the nannw oorrelator code error function is shown to be
limited
relative to die wide cornelamr code error ion. FIG. 21A shows a received code
signal, and FIGS. 21B-21E depict a narrow E-L window aligned with a code
transition
(FIG. 21B), aml advanced by a half chip, one chip and 1.5 chip, respectively
(FIGS.
21C, 21D and 21E~. The corresponding code error function is plotted as a solid
line in
FIG. 21F, in comparison with the code error function for the wide correlator
discussed'
earlier, plotted as a broken Line.
FIGS. 22A 22D show how the narrow oanelator dramatically ~erIuces the
impact of multipath signals. FIGS. 22A and 22B show the directly rxeived code
and an
example of a rooeived multipath code, and FIG. 22C shows the code error
functions for
the two; these curves being identical with those shown in FIG. 20C. FIG. 22D
shows
for comparison the code e~r~rnr funedons for the directly rxeivod and received
multipath
codes when a narrow correlator is used. Significantly, the track point advance
and delay
due to multipath signals with a delay somewhat greater than half the window
width
become symmetric about the multipath-firee track point, as indicated by the
track points
at 400', 402' and 404'. Therefore, not only is the effect of static multipath
greatly
reduced, but dte nxidual bias from multip~h with a delay somewhat greater than
half the narrow comelator window width is eliminated. As a result, motion of
the
receiving antenna relative to reflecting objects does effectively eliminate
the effect of
multipath from these objects.


CA 02525798 1996-05-24
-22-
The narrow con:elator has a disadvantage in searching for a signal. When
a signal is first detected, the received and local codes may be misaligned by
a large
fraction of a chip. In this case, the wide correlator provides a much larger
error signal
than the narrow correlator. As a result, the wide cornelator will pull the
tracking loop
into alignment much faster than the narrow eorrelator. GaCe the codes are
aligned within
the oena~al linear slope region of the narrow correlator error function, both
the wide and
the narrow correlator provide identically the same direct path error signal to
the tracking
loop with sufficient roceiver bandwidth. (The narrow correlator error function
slope can
be attenuated if the receiver bandwidth is restricted.) Therefore, it is
customary to use
a wide correlator during signal acquisition and then switch to the narrow
correlator for
tracking after initial code alignment.
Effect of Multipath on Phase Measurement:
As noted above, highly accurate navigation or positioning measurements
can be obtained from measurements of carrier phase. When multipath signal
components
are present, however, the receiver tracks the composite phase of the direct
signal plus
all of the multipath signals. In erect, the direct signal carrier measurements
are distorted
by the multipath components. An important object of the present invention is
to reduce
or eliminate the effects of multipath signals on the measurement of carrier
signals.
Conclusion of Background:
In view of the foregoing, it will be understood that there is an ongoing
need for improvement in the accuracy of navigation and position signals
derived from
the GPS, and that a significant source of errors in GPS measurements is the
presence of
multipath signal energy at the receiver. Ideally, what is needed is a system
for
eliminating or,dramatically reducing.multipath effects on code and carrier
synchroniza-
tion, and thereby improving the . speed ~ and accuracy of GPS measurements and
position
solutions. The present invention satisfies this need.


CA 02525798 1996-05-24
-23-
SUIIdMARY OF TW ~IN'VENTION
The present invention achieves the objectives outlined above, and other
objectives, by providing an improved method and apparatus for e~Ctin~g code
synchronization in a global positioning system receiver. ~ Within the
receiver, digital
in-phass (n and quadratm~e (Q) samples of a phuality of received pseudorandom
noise
(PRIG encoded signals are provided to a code synchronization circuit: The code
synchronization circuit is designed for coherent mode operation when the
receiver has
achieved phase-lock with one of the PRN coded signals, and operates in a non-
coherent mode otherwise.
The roceiver includes an I-channel correlator for producing a coherent mode
discrimination signal by correlating in phase (l) samples of a first of the
rrec e~eived PRN
encoded signals with a disetimination pattern, wherein the first PRN encoded
signal is
encoded with a first PRN code. The discdmiaation pattern is comprised of two
or more
PRN code modulation components, the phases of which are adjusted based on the
value
of a code phase control signal obtained by averaging or otherwise processing
the
coherent mode diserlmination signal.
During non-coherent mode operation, both ties; in phase (n and quadrature (~
samples of one of the PRN-encoded signals are con~elatcd with a discrimination
pattern.
In addition, the in-phase (I) and quadratnre (~ samples of the one PRN-encoded
signal
are also correlated with a -locally~~rated replica of the PRN code used to
encode the
one PRN-encoded signal. The results of the two I-channel correlations are then
multiplied, as are the results of the Q-Ghaa~l cornlations. Next, the
resultant product
signals are combined into a non-coherent mode discrimination signal. A non-
coherent
mode code phase control signal, useable to control the phase of the locally-
generated
p'ItN-erreoded signal, is obtained by averaging or otherwise processing the
non-coherent
mode discrimination signal.
In a prefen~ed implementation, the first and second modulation components are
generated to be of nonzero values for first and second intervals,
respectively, during
each period of the PItN-encoded signal, and tv be of zero value otherwise. It
has also


CA 02525798 1996-05-24
-24-
been found that improved synchronization may be achieved by scaling the
magnitude of
the first modulation component relative to the magnitude of the second
modulation
component.
As it pertains to code tracking, the present invention may also be defined
as apparatus for mitigating effects of multipath signals on code tracking of
the received
PRN signals in a receiver for decoding received pseudorandom noise (PRIG
encoded
signals. Briefly, and in general perms, the apparatus comprises a P1ZN code
generator for
generating a replica of the PRN code and for generating related code multipath
mitigation windows (NllIZWs); a controllable oscillator, for generating timing
signals for
the PRN code generator; a first correlator, for correlating the received PRN
signals with
the replica of the PRN code, to derive phase error signals used for
controlling the
oscillator; aad a second correlator, for correlating the received PRN signals
with the
code MMWs, and thereby generating code error signals, in acxordance with a
code error
function, used to control the PRN code generator to synchronize ~e generated
PRN code
with the received PRN code signals. The code error function effectively has a
zero value
at a desired track point when the. generated PRN code is synchronized with the
received
PRN signals and, immediately on each side of the tracking point, has a
polarity that
depends on whether the generaoal PItN code is early or late with respect to
the received
PRN code.
~ In accordance with an important aspect of the invention, the shape of the
:~ code MMW generated by the PRN code generator is selected to provide a code
error
function that mitigates the effect of received multipath signals by providing
an error
value that increases rapidly in opposite directions from the track point, but
assumes a
practically zero .value when the code MMW is advanced only a fraction of a PRN
code
chip from the track point. Therefore, a code error function associated with
delayed
multipath code signals will have a practically zero valve near the desired
track point and
thus will have little or no effect on tracking the received code signals. The
code MMW
may, for example, have multiple instances that are timed to occur only at
received PRN
code transitions, or it may be timed to occur at every code clock position,
regardless of
whether or not ihere.is a.PRN code transition.~Each instance of the code MMW
may be


CA 02525798 1996-05-24
sylllmettlC SbOtlt tllC dCSitnd "~1C~ point, and ~ llaVe' a ~CCnti81 ~ent~ Of
One pOlarlty aIld
two adjacent segments of the opposite polarity, resulting is an individual
average value
of zero. Alternatively, each instance of the code~MMW may be asymmetric about
the
desired track point, and may include a first approximaately aligned with the
clock
S position and a second segment adjacent to the first segment and having
opposite polarity
and a different amplitude or width relative to the first segment. Whatever the
specific
form of the code MMW, it may have multiple instances that collectively have a
zero
average value.
In method terms, the invention as it pertains to code tracking comprises
the steps of g~atmg a replica of the PRN code; generating code multipath
mitigation
windows (MlldWs); generating timing signals, in a controllable oscillator, to
control the
steps of generating the replica of the P12N code and the code MMWs;
correlating the
received PRN signals with the replica of the PRN code, to derive phase error
signals
used for controlling the oscillator, correlating the received PRN signals with
the code
MMWs, and thereby generating code crmr signals, in accordance with a code
error
function; and controlling the step of generating the PRN code, to synchronize
the
generated PRN code with the received PRN code signals.
As it pe~ias to carrier or phase uack~g, the invention comprises a PRN
code gencraaor for generating a replica of the PRN code and for generating
related phase
multipath mitigation windows (MMWs); a controllable oscillator, for generating
timing
signals for the PRN code generator; a first correlabor, for correlating the
received PRN
signals with the replica of the PRN code, to derive phase error signals used
for
controlling the oscillator; a second eorrelator, for correlating the rxeived
PRN signals
with the phase MMW, and thereby obtaining first samples of the received PRN
signals
prior to a code transition and second samples of the received PRN signals
iiamediately
after a code transition; and phase c~iculation logic, for eliminating the
effect of multipath
components by vector averaging multiple instances of the first and second
samples of the
received PRN signals, to obtain the phase of the directly received PRN
signals. In one
embodiment of the invention, the phase MMW includes a fwst segment for
obtaining a
first sample of the received PItN signals immediately prior to the transition
and a second


CA 02525798 1996-05-24
segment for obtaining a second sample of the PItN signals immediately after
the
transition. In another embodiment, the phase MMW includes a first instance
with
immediately after code clock times where there is no code transition, to
obtain
first samples of the received PItN signals, and a sacond insrancx with
segments occurring
immediately after' cods clock times where theta is a code transition, to
obtain second
samples of the received PRN signals. In yet another embodiment, the phase MMWs
~~ include a first instance with segments occurring immediately after a code
transition and
a second instance with segments occurring at any selected time not close to a
code
transition.
In method terms, the invention as it pertains to carrier phase tracking
comprises the steps of generating a replica of the PRN code; generating
related phase
multipath mitigation windows (MHiWs); generating, in a controllable
oscillator, timing
signals for controlling the steps of generating the PRN code and the related
phase
MMWs; correlating the received PRN signals with the replica of the PRN code,
to
derive phase error signals used for controlling the oscillator; correlating
the received
PRN signals with the phase MMWs, and thereby obtaining fast samples of the
received
PRN signals prior to a code transition and sxo~ samples of the received PRN
signals
immediately after code transitions; and eliminating the effect of multipath
components
by vector averaging the first and second samples of the received PRN signals,
to obtain
the phase of the dimctly received PRN signals.
It will be appreciated from the foregoing that the present invention
represents a significant advance in the field of PRN code receivers, such as
GPS
receivers. 1n particular, the iuveotiaon provides for the minimization or
elimination of the
effects of received multipath signals on code and phase synchronization of the
receiver
with the received signals, and on measurcmems based either on PRN code or on
carrier
. phase. Other aspects atul, advantages of the invention will become apparent
from the
following more detailed description.


CA 02525798 1996-05-24
27-
BRI~F' DESCRIPTION OF T~ ~DRAWfI~TGS
Additional objects and features of the invention will be more readily
apparent fmm the following' detailed description and appended claims when
taken in
conjunction with the drawings, in which:
FIG. I shows a block diagram reption of a coonal global
positioning system (GPS) receiver.
FIG. 2A is a timing diagram of an exemplary sequence of the CIA code
carried by a received GPS satellite signal. . ,
IO FIGS. 2B, 2C and 2B respectively depict locally-generated one-half chip
early, ono-half chip late, aad prompt versions of the exemplary CIA code.
FIG. 2D is a timing diagram of a normalized early-minus-late discrimina-
tion pattern (DP) chatacterixed by one-chip conrelator spacing.
FIG. 2F is a timing diagram of II8 chip early minus II8 chip Late
discrimination pattern (DP).
FIG. 2G illustratively represents an earliest one-eighth modulation
component of a one-eighth early version of the exemplary CIA code.
FIG. 2H illushates the last modulation component of a version
of the exemplary CIA code which is shifted to the right by one-eighth of a CIA
code
chip.
FIG. 2I is a timing diagram of a discrimination pattern in accordance with
the invention obtained by using modulation componems of one-eighth chip
duration.
FIG. 21 depicts a discrimination pattern consisting of one-eighth chip
modulation components of a one-sixteenth early-shifted version of the CIA
code.
FIG. 2K provides another example of a discrimination pattern comprised
exclusively of modulation componerns derived fmm an early-shifted version of
the CIA
code.
FIG. 3A is a graph of a discrimination function depicting variation in the
DC value of the CIA code phase control signal generated within the GPS
receiver of
FIG. 1.


CA 02525798 1996-05-24
-28-
FIG. 3B depicts a discrimination function representative of the variation
in the DC value of a C/A code phase control signal generated using the
discrimination
pattern of FIG. 2F or. 2I. .
FIGS. 3C and 3D are graphs of the discrimination functions characterizing
variation in the averaged value of discrimination signals generated using the
discrimina-
tion patterns of FIGS. 2J and 2K, respectively.
FIG. 4 shows a block diagram representation of a global positioning
system (GPS) receiver configured to perform code-synchronization in accordance
with
the invention.
FIG. 5 depicts a preferred implementation of a component discriminator
module operative to correlate the received I-charnel satellite signal 1(t)
with a selected
discrinnination pattern (DP).
FIG. 6 provides an illustrative representation of the contents of a code
programmable head-only memory (PR011~ included within the component
discriminator
module of FIG. 5.
FIGS. 7A-7G together illustrate the concept of autocorrelation.
FIG. 8 is a simplified schematic diagram of a pseudotandom (PIZN)
modulator.
FIGS. 9A-9C show a carrier, a code signal and a modulated carrier signal
consistent with the modulator shown in FIG. 8.
FIG. 10 shows the power density of a spread spectrum signal.
FIG. 11 is a simplified block diagram of a global positioning system
(GPS) satellite transmitter.
FIG. I2 is a block diagram illustrating a received PRN signal correlation
process.
FIGS. 13A and 13B are waveforms. of input and output signals for the
block diagram of FIG. 12.
FTG. 14 is a block diagram of a PRN signal receiver of the prior art.
FIGS. .lSA.and 15B are block diagrams illustrating the generation of phase
error signals by correlation of.an incoming signal with a reference signal.


CA 02525798 1996-05-24
29-
FTGS. 16A and ~l6B:arc block:diagrams further illusttatiag the ge~ration
of phase error signals by correlation of an incoming signal with a reference
signal.
FIGS. I7A-I7H are waveforms of a received code signal and various
other signals illustrating the ooncxpt of forming an early minus late signal
with which
to track the received code.
FIGS. 18A-18E are waveforms of a received code signal and an early-
minus-late code signal at various time relationships with the raxived code.
FIG. I8F is a graphical retion of a code error function resulting
from use of a wide correlator early minus late window:
FIG. 19 is a diagrammatic illustration of the origin of multipath effects.
FIGS. 20A and 20B show a directly received code and a received
multipath code.
FIG. 20C is a graphical representation of a code error function for the
directly received code, for the received multipath code, and for the sum and
difference
of these code error functions.
FIG. 21A shows a received code signal.
FIGS. 21B 21E show a narrow correlation window at various phases of
alignment with the received code transition.
FIG. 2IF is a graphical representation of a code error function resulting
fmm use of the narrow correlation window, shown in contrast with the code
error
function resulting from a wide correlation window.
FIGS. 22A and 22B show a dirxxly received code and a delayed received
multipath code.
FIG. 22C is a graphical representation of the code error functions for the
directly received code and the nrultipath code.
FIG. 22D is a sinnilar representation of the code error functions for the
directly received cock and the multipath code when a narrow correlator window
is used.
FIG. 23A shows a t~eceived code.
FIGS. 23B-23B show a symmetries! nrultipath mitigation window (MMV~
at various phases of alignment with the recxived,code signal transition.


CA 02525798 1996-05-24
-30-
FIG. 23F is a graphical representation of a code error function resulting
from use of this MMW.
FIG. 24A shows ihc same received code as FIG. 23A, but drawn to a
different time scale.
FIG. 24B shows a similar shaped MMW to the one in FIG. 23B.
FIG. 24C shows a code error fltaction similar to the one in FIG. 23F.
FIGS. 25A-25F summarize sonoe of the earlier fig~n~ and show the effect
on the code ermr function of a symmetrical MMW located only at code
transitions;
FTGS. 25A and B show a received code and a mceived multipath code: FIGS. 25C
and
25D show a narnow correlator window and a multipath mitigation window (MME;
FIG. 25E shows the code error ftmctions for the narrow correlator; and FIG.
25F shows
the code error functions for the MMW.
PIGS. 26A 26E show the effect on the code error function of a
symmetrical MMW located at every code clock time.
1S FIGS. 27A-27E show the effect on the code error function of an
asymmetrical MMW located at every code clock time.
FIGS. 28A 28C show a code transition, a conmsponding multipath
transition and a phase MMW for sampliag the phase of a received signal
immediately
lxfore and after each code transition;
FIGS. 29A and 29B are vector diagrams showing the vector relationships
between the received and multipath signals before and after a code
tc~ansition.
FIGS. 30A-30D show a teceivod ode, a phase MMW located inomedi-
ately after the code clock at a code transition, another received code sample,
and an
asynnmetric MMW located immediately after the code clock at a non-transition.
2S FIGS. 31A-31C are vector diagrams showing the vector relationships
between the received and multipath signals during .the phase MMW intervals
defined in
FIGS. 30A and 30D.
FIG. 32 is a block diagtstn of. the code and phase tracking portions of
PRN code receiver capable of employing code and phase multipath mitigation
techniques.
FIGS.:33 and:34.are block diagrams similar;to FIG. 32, but applying the


CA 02525798 1996-05-24
-31-
same principles to a GPS receiver in which the received signals have been
subject to
anti-spoofing encryption.
FIG. 35 is a logic diagram of an illustrative PRN toder.
FIGS. 36A 35G are waveforms of signals associated with the PRN coder
S of FIG. 35.
FIG. 37A shows received code sego, and FIGS. 37&37E are
examples of various fot5ms of code multipath mitigation windows.
DESCR>~'TION OF THE PREFERRED EMBODIMENTS
Referring to FIG. 1, there is shown a block diagram repr~seatstion of a
conventional global positioning system (GPS) raxiver 10. As shown in FIG. 1,
the
Ll-band and L2-band PRN-encodod frequency signals simully received by an
antenna 1 I froth a plurality of GPS satellites are supplied to an R. F.
downconverter 13
IS through a high-frequency transmission line or waveguide I5. The R.F.
downconverter
13 is operative to convert the received signals to a plurality of intermediate
frequency
(LF.) signals. The LF. signals from downconverter 13 are supplied to an LF.
processing
network 17, which includes an intermediate frequency section and a set of ana-
log-to-digital converters. The LF. processing network 17 provides phase
quadrature
digital representations of one of the received Ll-band (or L2-band) PRN-
encoded
satellite signals, which are respectively identified hereinafter as In-Phase
(Ll,) and
Quadrature-Phase (Ll~ signal components. The digitized Ll band signals LI, and
LIQ
are said to be in "phase quadrature" due to the phase shift of 90 degrees
existing
between their respective L1-band carriers.
The Ll-band digital outputs from the LF. processing network 17 are
supplied to a set of baseband processors 21, one of which is shown in FIG. 1.
Each
baseband processor 21 is associated with a separate satellite from which a
signal is
received: The nuraber of baseband processors provided is sufficient to ensure
that a
separate baseband processor is available for each received satellite signal.
As is described
below, each baseband processor 21 correlates the LF. outputs from the network
17 with


CA 02525798 1996-05-24
-32-
a locally generaxd replica of the CIA code unique to a given satellite. The
LF. outputs
are also correlated with a discrimination pattern comprised of the differe~e
between
early and late versions of the locally generated CIA code.
Referring to FIG. 1, a CJA code generator 27 is seen to provide a C/A
code replica to an early prompt late (EPL) shift register 29 which includes
early (1~,
prompt (P) and late (L) gates. An early-mimes-left discrimination pattern is
formed by
combiner 33 by taking the difference between the GA code samples latched by
the early
(L~ and late (L) gates. Skive samples of the CIA code replica produced by the
CIA
code gen~raLor 27 are circulated t>mongh the EPL shift r~isDa 29 at a clock
rate selected
in socordance with the desired time offset (i.e., "correlator spacing")
between the early
and late CIA code samples comprising each sample of the discrimination
pattern. For
example, to achieve a one chip correlator spacing the clock rate through the
EPL shift
regis0er 29 is sela~ed snch that a time onset of 'fs chip exists bctwoen the
early (~ and
prompt (P') samples, and lax so that a tiu~ offset of 'fs chip also exists
between the
prompt (P) and late (L) samples. Narrower correlator apacings are obtained by
increasing
the clock rate at which C/A code samples are passed through the EPL shift
register 29.
Referring again to FIG. 1, the LF. outputs from the netwoik 17 are
conzlated with the early minus late (ErL) discrimination pattern from the
combiner 33
within LI I-channel and Ll Q-channel 1? L correlators 37 and 39. In addition,
the
prompt CIA code samples from the regisoer 29 are correlated with the LF.
outputs using
Ll I-channel and Ll P-channel prompt correlabors 43 and 45. The correlation
results
from the oornelators 37, 39, 43 and 45 are provided to a phase tracking
processor 50,
which adjusts the phase of the CIA code generator 27 so as to achieve phase-
lock with
the CIA 'code carried by the received GPS satellite signal.
ps mentioned above, a discrlm~ation pattern characterized by one-chip
correlator spacing may be formed within the combiner 33 by clocking the EPL
shift
register 29 such that a 'fi chip phase difference exists between each of the
early, prompt
and late CIA code samples therein. ~ Turning now . to FIG. 2A, a timing
diagram is
provided of the CIA code ~ carried by the received GPS satellite signal. The
vertical
. dashed lines of FIG. 2A are representative of the CIA code clock period, and
hence are


CA 02525798 1996-05-24
-33-
s~arated by an interval equivalent to the duration of one CIA code chip. As is
'indicated
by FIG. 2A, tt'aasitians in the logical state of 'the received CIA code oocnr
at the
boundaries between CIA code clock perhods.
In FIGS. 2B, 2C and 2E, the locally generated one-half chip early,
one-half chip late, and prompt C/A codes are respectively depicted. In the
exemplary
representation of FIG. 2 is assumed that tl~ CIA code generator 27 is locked
to the
phase of the received CIA code. Accordingly, the pmmpt CIA code (FIG. 21~ is
seen
to be in precise time-alignment with the t~eceived CIA code (FIG. 2A).
Referring to FIG. 2D, a timing diagram is provided of a nonmaliud early-
minus-late discrimination pa~rn (D~ cl>aracberiud by one-chip correlator
spacing. The
standard early-minus-late DP of FIG. 2D is soen bo be of a value of negative
one for a
one-chip period about each positive to negative transition is the rxeived CIA
code (FIG. 2A). That is, the standard DP "bras" each such CIA code by
exhibiting
a value of negative one for a period of one-half chip before and after each
transition.
IS Similarly, the standard DP "btaclocts" each negative to positive CIA code
transition by
being of a value of positive one for a one-chip period about each transition.
It is
observed that the stamlard DP only assumes a zero value about each CIA code
chock
boundary (vertical dashed line) at which the received CIA code fails bo
transition
between logical states.
The processor 50 is generally disposed to operate in one of two modes
depending upon whether or- not the receiver 10 has become phase-locked to the
carrier
frequency of die received GPS signal. Prior to the establisbment of phaso-lock
with the
received carrier, the processor 50 operates in a no~coherent mode to strip the
received
carrier from the outputs of the IiL ~Iators 37 and 39. Specifically, the
output of the
I-channel hiL correlator 3'T is multiplied by the output of the I-channel
prompt correlator
43, and the ou$ut of the Q~hannel Br-L correlator 39 is multiplied by the
output of the
Q-channel prompt correlator 45. The two rasvlts are then added ate averaged in
order
to produce a CIA code phase control signal 54 applied to the CIA code
generator 27.
Once phase-lock with the received carrier has been established, the
received carrier is completely removed from the received I-channel and Q-
channel


CA 02525798 1996-05-24
-34-
signals during correlation with the discrimination pattern in eorrelators 37
and 39.
During such "mode" operation, the averaged output of the I-channel correlator
37 comprises the CIA code phase control signal 54 provided to the CIA code
generator
27. The CIA code phase control signal 54 will be of a predefined DC value
(typically
zero) when the prompt and received CIA codes (FIGS. 2E and 2A) are in
alignment.
When the discrimination pattern (FIG. 2D) drifts in phase relative to the
received CIA
code (FIG. 2A), the f 1 values of the discximination pattern will no longer
evenly
"braclaet" transitions in the ClA code. This misalignment is sensed by the
processor 50,
and the control signal 54 is adjusted in accordance with a non-zero value
until phase
~ alignment is again achieved with the received CIA code.
FIG. 3A is a graph of a disc~ination function depicting variation in the
DC value of the CIA code phase control signal 54. For convenience of
illustration,
FIGS. 3A-3D assume the eacisoence of an infmiLe processing bandwidth within
the GPS
satellite and receiver. Ia the illustration of FIG. 3A, variation in the DC
value of the
IS signal 54 is represented as a function of the phase offset between the
locally generated
prompt and received GA codes (FIGS. 2E and 2A). For example, the control
signal 54
assumes a normalized value of negative one when the prompt C/A code is 'k-
chip Late
relative to the received CIA code. Similarly, when the locally-generated
prompt CIA
code is 'fi chip early relative to the received CIA code, the CIA code control
signal
becomGS positive one. Since the prompt CIA code is synchronous with the early-
minus-
late (E-L) discrimination pattern (DP) produced by the combiner 33, FIG. 3A is
equally
representative of the variation in the value of the .control signal 54
relative to the phase
of the E-L DP.
As mentioned above, it. has, been found that the use of discriminadoa
patoerns characoerizod by a oorcelaLvr spacing of less than one CIA code chip
has enabled
improved tracking performance in the presence of received multipath signal
energy.
Referring to FIG. 2F, a timing diagram is provided of a "1/8 chip early" minus
"1!8
chip late" discrimination pattern (DP). In order to produce the DP of FIG. 2P,
the clock
rate of the EPL shift register 29 is i~eascd relative . to the case in which
the correlator
spacing.is one C/A code chip. When the DP.of FIG:.2F is supplied to the
cornelators


CA 02525798 1996-05-24
-35-
37, 39, 43 and 45, the DC value of the resultant CIA code phase control signal
varies
in accordarsre with the discrimination function of FIG. 3B.
As is described hereinafter, the present invention is directed to a technique
for generating a uniquely-formatted discrimination pattern resulting in
improved
insensitivity to received multipath signal energy. Each discrimination pattern
formed in
accordance with the invention may be viewed as comprisiqg two or more
modulation
waveforms, hereinafter referred to as "modulation components". One
distinguishing
feature of the discrimination patterns contemplated by the present invention
is that the
constituent modulation components assume non zero values during only a small
portion
of each CIA code chip period. As an example, the timing diagram of FIG. 2G
illustratively ran "earliest one-eighth" modulation component of a "one-eighth
early" version of the CIA code. That is, the modulation component of FIG. 2G
may be
generated by shifting the prompt C/A code (FIG. 2E) to the left by one-eighth
of a CIA
code chip, and by then setting the resultant shined CIA code to zero except
during the
first one-eighth of each CIA code clock cycle. Similarly, FIG. 2H illustrates
the last
one-eighth modulation component of a version of the prompt CIA code which is
shifted
to the right by one-eighth of a CIA code chip. Although the present invention
is
described herein with reference to a discrimination pattern formed from
signals
modulated with the CIA code, the teachings of the present invention are
equally
applicable to discrimination patterns foamed from P-code signals or various
other types
of PRN-encoded signals.
Referring now to FIG. 2I, a discrimination pattern is accordance with the
invention is obtained by subtracting the latest one-eighth component of the
one-eighth
late CIA code (FIG. ZITj from the first one-eighth component of a one-eighth
early
version of the prompt CIA code (FIG. 2G). Referring to FIG. 2I, it is seen
that the
discrimination pattern is of a value of positive and negative one for one-
eighth chip
intervals immediately before and after each chip boundary at which the
retxived CIA
code (FIG. 2A) does not transition between logical stags. It follows that
these one-eighth
chip compon~ are multiplied by the same value of the received CIA code, and
hence
that an average value of zero results. Since these one-eighth chip components
"bracket"


CA 02525798 1996-05-24
-36-
chip boundaries at which the received C1A code does not change logical state,
small
variations in the phase of the discrimination patoern will not alter this zero
average value.
As mentioned above, it has been found that received multipath energy
adversely affects the "late" portion of comrentional early-minus-late
discrimination
patoerns. Similarly, in the discrimination pattern (DP) of FIG. 2I, the latest
one-eighth
component of the one-eighth late version of the C/A code is believed to be
more
susceptible to corruption by multipath than is the other modulation component
of the DP.
This stands to n;ason, since the conventional discrimination pattern of FIG.
2F and the
discrimination pattern of FIG. 2I yield the same discrimination function (FIG.
3B).
In accordance with the present invention, the discrimination patterns
described hereinafter are formed exclusively from early-shifted C/A code
modulation
components. As an example, FIG. 2J depicts a discrimination pattern having a
first
modulation component oonsisring of the earliest o~-eighth component of a one-
sixteenth
early-shifted version of the CIA cede (scaled in magnitude by a factor of
two). The
~ discrimination pattern of FIG. 21 is formed by sabtcacting from the first
modulation
component a secana modulation component. The second modulation component
consists
of the second earliest one-eighth component of a one-sixteenth early-shifted
version of
the CIA code (of.unity magnitude). Since both of the modulation components of
the
discrimination pattern (DP) of FIG. 2J are derived from an early-shifted
version of the
.. C/A code, and hence do not incorporate any "late" components, the DP is
believed to
be substantially insensitive to received multipath signal energy.
FIG. 2K provides another example of a discrimination pattern (DP)
comprised exclusively of modulation components derived from an early-shifted
version
of the C!A oode. In particxtlar, the DP of FIG. 2K includes first and secotxl
modulation
components . consisting of the first and second earliest one-eighth components
of a
. one-eighth early-shifted version of the CIA code. The DP of FIG. 2R is then
formed by
subtracting from the first two modulation components a third modulation
component
consisting of the third earliest one-eighth . component of the one-eighth
early-shifted
version of the CIA code. It is observed that the discrimination patterns of
FIGS. ZJ and
. 2K both change value during every period of the C/A code,~.thereby
bracketing each CIA


CA 02525798 1996-05-24
-37-
code clock phse boamdary irr~earve ~ of whet>ter a transition in the received'
C%A code
has occurred at the boundary. In contrast, conventional early-Iate
discrimination patterns
(e.g., FIG. 2D) only bracket changes in the logical state of the received CIA
code.
Referring now to FIG. 4, a ii~onai block diagram t~epretion is
provided of a global positioning system (GPS) receiver 100 configured in
accordance
with the invention. The rxeiver 100 i~lndes a discrimination pattern (DP)
generator
110 disposed to ge~rate discrimination patterns of the type depicted in FIGS.
2I-2K.
The phases of the discrimination patterns pmduced by the DP generator 110 are
adjusted
in accordance with a DP phase control signal 114, the valve of which is
indicative of the
phase offset between the locally-generated CIA code (or P-code) and the CIA
code (or
P-code) carried by the received GPS satellite signals. As is discussed below,
the DP
phase control signal 114 is derived from the results of correlation of the
discrimination
patterns produced by the DP generator I10 with the received GPS satellite
signals.
Dwyng operation, the DP phase control signal 114 adjusts the phase of the ClA
code or
P-code clock signal gel within the DP generator i 10, thereby achieving
time-alignment between the phase of the locally-generated code and the code
phase of
the received satellite signals.
In the functional represen~tion of FIG. 4, the PRN-encoded GPS signals
simultaneously rexivod by an anbenfla 121 from a phnality of GPS satellites
are supplied
to a frequency conversion n~vvork I23 d~ro~ugh a high fiuquency transmission
line or
waveguide 125. The network 123 is operative to convert the tnceived GPS
signals to a
plurality of digitized irnennodiate frequency (LF.) signals. SpeciixcatIy, the
network 123
provides In-phase and Quadrature digital stations of the revived Ll-band
CIA-encoded GPS satellite signal. It is understood, however, that the
teachings of the
invention could be equally applied to facilitate synchronization with the P-
code carried
by either Ll-band or L2-baml signals.
When expressed as a function of time, the received In-phase Ll signal
from a given satellite may be denotod as 1(t), and is given by:
I(t) _ ~C(t)d(t)+a~C(t-Q)d(t-a)cos8~,


CA 02525798 1996-05-24
-38-
where C(t) is the received G/A code unique to the given satellite, d(t) is the
received
navigation data, S is the received signal power, a is the amplitude ratio
between received
multipath energy and the signal S, Q is the time delay of the multipath
relative to the
rxeived signal, and 8" is the relative phase between the signal and the
multipath.
In the functional representation of PTG. 4, the signal 1(t) from the given
satellite may be vicarod as being correlated with the discrimination patDern
from the DP
generator 110 within a first Ll I-channel correlator 140, and as being
correlated with the
locally gere,~rated prompt C/A code (C/A~ wlthirt a second Li I-chanztel
cornelator I42.
v However, in a preferred impltion the funcxions performed by the DP generator
1 i0 and the Li I-channel correlator are combined within a unitary device
hereinafter
referred to as a modulation oamponem discximinator module. The strucdtre and
operation
of the modulation component discriminator module is described below with
reference to
FIG. 5.
Again referring to- FIG. 4, the received signal Q(t), in phase quadrature
vvith.l(t), is correlated with the discximination pattern fmm the DP generator
110 within
a first Li Q-channel eorrelator.144. Si~arly, the rxeived signal Q(t) is
correlated with
the locally generated prompt C/A code (C/A,p ) within a second Ll Q-channel
correlator
146.
When the receiver 100 is initially wtnad-on or otherwise fails to maintain
phase-lock with the carrier of the received GPS signal, the receiver 100
functions in a
"non-ooharent" mode. Dln~ing non-coherent mode operation, a switch 150 is set
to throw
position i50a until phase-lock with the received carrier is again achieved.
Descriptions
of both coherent mode and non~oherent mode operation of the receiver I00 are
provided
immediately below.
coherent-Modg tion
Upon the achievement of phase-lock with the received carrier, the switch
150 is set to throw position .I50b ~ in order to ~ initiate coherent-mode
operation. Under
these conditions the navigation data d(t) may be separately removed from the
received


CA 02525798 1996-05-24
-39-
signal within a demodulator (not shown); ~hcnoe'allowing the~received'signal
I(t) to be
expressed as:
I(t)~C~(t)+a~G'(t-a)cos6~
Durinig oolurent mode operation, the output of the I-channel corredator 140
produces a
coherent mode discrimination signal D~(r), which is provided to as averaging
circuit
154. As is indicated ~ by FIG. 4, the averaged vaine of the signal D~,,(r)
forms the DP
phase control signal 114 supplied to the DP generator 110. In the general
case, the signal
D~(r) may be expressed as:
T g T 28'
D~(i) ~ f I(~~ ~x(t-'r~-1 f I(~ ~ ~x(t-T)~
0 1 2 0 8+1
where T is the period of the C/A code, and c,~(t) is the k"' modulation
component
included within a discrimination pattern (DP) comprised of a set of 2K
modulation
components. The modulation components c,~(t) are defined as:
Cr(t)_E as~(t ~.T~
where /3j is the value (i.e., tl) of the CIA code du~3ng a f~ code cycle, and
~t(t) is a
pulse function admitting to the following representation:
~x(t)= 1 for (k-1)TIN s t s kTIN
~x(t)= 0 othenv~se
where N corresponds to the number of modulation components.
Non-coherent ~,od~~eration
As mentioned above, during non-coherent anode operation the receiver 100
is out of phase-lock with the received carrier. In order to remove the carrier
phase
component from the received GPS signals, both the I-channel signal 1(t) and
the received
Q-channel signal Q(t) are u9ed during formation of the non-coherent mode
discrimination


CA 02525798 1996-05-24
-40-
signal DNCM(s)~ As an example, a quantitative representation of a non-coherent
mode
discrimination signal DNCM(r) derived from a discrimination pattern comprised
of two
modulation components c,, cl is set forth below:
T T
D(s)= f I(t)[ct(t-~)-0.5c2(t-t))dt ~s f I(t)CIAp(t-t)dt
.o 0
T T
f Q(~[ol(t-'t)-0.5cz(r-z)1~ ~s f Q(~CIAp(T-s)dt
0 0
wherein c~ and cz cort~espond to the two earliest modulation components of a
version of
the prompt C/A code (C/AP) shifted early by the time offset r. For the
specific case of
the discrimination patDern depicted in FIG. 2J, the first modulation component
cl
corresponds to the earliest one-eighth component of a version of the prompt
C/A code
(C/Ap) shifted early by 1/16 of a CIA code chip (i.e., r = T/16). Similarly,
the second
modulation component cornesponds to the neat earliest one-eighth component of
a
version of the prompt C/A code (C/Ap) shifted early by T/16.
FIGS. 3C and 3D are graphs of the discrimination functions characterizing
variation in the averaged value of the discrimination signals, i.e., of either
D~(r) or
D~(r), generated using the discrimination patterns of FIGS. 2J and ZK,
respectively.
That is, the discrimination functions of FIG. 3C and 3D are equally
representative of
coherent mode and non-coherent mode operation. FIG. 3C provides a
representation of
the variation in the value of the code phase control signal 114 for the case
of the
discrimination pattern depicted in FIG. ZJ. Again, the horizontal axis of FIG.
3C is
indicative of the phase offset between the received CIA code and the locally
generated
prompt CIA code (C/Ap).
Referring again to FIG. 4, a description will now be provided of those
signal processing elements within the receiver 100 primarily responsible for
generating
the non-coherent mode discrimination signal D,,,c~i(r). In particular, the
signal I~,,o", (r)
is seen to be provided by a summer 170, the output of which is switchably
connected to
the averaging circuit 154 through the switch,,150. The summer 170 adds the
product


CA 02525798 1996-05-24
-41-
signals produced by first and ~ second. non-cohenaat c~ha~el multipliers ~
~i?4 'and 1?8. As
is i~ic~tod by FIG. 4, multiplier i?4 forms a first of the two product signals
provided
to summer 1?0 by multiplying . the correlation result from ~ the I-chancel
correlator 140
with the agn 182 of the output produced by the I-channel correlator I42.
Similarly,
S multiplier 1?8 forms a second productvaignal by multiplying the ion result
from
the Q-channel correlator 144 with the sgn 184 of the output produced by the Q-
channel
correlator 146.
Tlte receiver 100 further includes a c~cria rotation circuit 192 and carrier
track circuit i94 coupled to the I-ehaanel eorr~laLors 140, 142, and to the Q-
channel
correlators 144, 146. The carrier rotation and carrier track circuits i92 acrd
194 operate
in a conventional manner to remove the cawier component from the correlated
outputs
produced by the c~rrelators 140, 142, 144 and 146.
Turning now to FIG. 5, a preferred implementation is depicted of a
component discriminator module operative to correlate the I-channel signal
I(t) with the
1S discrimination pattern (DP). The component discuminator module comprises a
unitary
apparatus which effects the functions performed by both the discrimination
pattern .
generator and the I-channel correlator 140. As is discussed below, the
component
discriminator module is responsive to the DP phase control signal from the
discriminator
patoern generator 110, cad produces the coherent mode discrimination signal
D~(r). In
the exemplary embodiment of FIG. S, the component discriminator module
correlates
the signal I(t) using a 10-component dise~mination pattern in which each
modulation
component is of a diuation of 0. i code chips. This i0-component
diseriraination pattern
is analogous to the 8-component dis~c~nination pattern of FIG. 2J, in that it
is formed
by combining the first two of the ten available modulation components. That
is, the
2S 10-component discrimination pattern is formed by subtracting, from the
first one-tenth
of the locally generated prompt code (i.e., ClA code or P code), the second
one-tenth
component of the locally-generated code scaled by a factor of one-half. This
discrimina-
tier pattern is of the "A-0.SB" type described above, where "A" corresponds to
the first
one-tenth of the locally generated prompt code and "B" corresponds to the
second
one-temp of the locally-generated prompt code. In addition, both the first (A)
and second


CA 02525798 1996-05-24
-42-
(B) one-tenth modulation components are generated so as to be "shifted early"
in time
by 1/20 of a code chip rrlative to the phaa~e of the locailly-generated prompt
code.
As is indicated by FIG. 5, the component discriminator module includes
a local code clock 202, the phase of which is controlled by the DP phase
control signal
114 (FIG. 4). The local code clock 202 is used to synchronize a Local code
generator
(not shown), which produces the locally generated version of the CIA code or P-
code
used by the I and Q chamrel correlators 142 and 144 (FIG. 4). The I-channel
signal 1(t),
vwhich in the embodiment of FIG. 5 comprises a 4-bit digital vahie received
from the LF.
proxssing work 123 (FIG. 4), is providod to a divide by~wo circuit 206, as
well as
to a.2 to 1. nrultiplexer 210. If D3, D2, Dl, and DO represent the 4 bits of
the I-channel
signal 1(t), where DO con~espoads to the least significant bit (LSB) and D3 to
the most
significant bit (MSB), then the 4-bit output of divide-by-two circuit 206 gay
be
expressed as 0, D3, D2, Dl.
During each code clock period defined by the local code clock 202, a
IS counter 214 provides a sequence of ten addresses to the code programmable
read only
memory (PROM) 220. Each of tl~ ten addresses identifies a memory location at
which
are stored values corresponding to each of .the ten modulation components of
the
10-component discrimination pattern used to cornlate die I-chant~l signal
1(t). In
particular, the value of each of the ten modulation components comprising the
ten
component discrimination pattern is defined by a set of three bits, i.e., by a
sign bit (S),
a multiplex bit (Ivl), and by a take/delete bit ('I). In the exemplary
embodiment the three
bits (S, M, T) corresponding to each modulation component are stored within
sequential
memory locations within the code PROM 220, the first of which is specified by
each of
the ten different addresses. received from the counter 214 during each code
clock cycle.
FIG. 6 provides an illustrative represemation of the contents of the code
PROM 220. As is indicated by FIG. 6, for each code clock period (i.e., "code
chip")
there , are stored a seque~x of ten sign (S) bits, ten multiplex (11II) bits,
and ten
take/delete ('I~ bits..In the.specific example of FIG. 6, the first chip (#1)
of the locally
generated code is assumed to be a zero; the second chip (#2) is a one, the
third chip (#3)
is a,zero, the fourth chip (#4):is a zero, and~the fifth:chip (#S~ is a one.
Although not


CA 02525798 1996-05-24
-43-
shown in FIG. 6, a set of S, M~and~ T bits asso~iatcd'with each' of the
remaining bits of
the locally-generated CIA' or P code are also stored ~ within the code' PROM
220. The
multiplexer 210 is co~rolled by 'the "M" ~ bit provided by the PROM 220.
Specifically,
the multiplexer selects the signal 1(t) when M 'is 0, and selects the signal
I(t)I2 imm the
divide-by-two 206 when the M bit is 1. It is observed that the values of the
"M" bit are
independent of the polarity (0 or 1) of tech code'chip (see FIG. 6). The
sequence of
M-bit values specified by FIG. 6 (0100000000), results in the multiplexer 210
selecting
the value of the signal I(t) for each of the ten modulation components within
the
discrimination pattern, except that for the second modulation component the
value of
I(t)l2 from the divide-by-two 206 is selected instead. This results in the
first, or "A",
component of the "A-0. SB" type dlscrlm;nation pattern being of unity
magnitude, and
of tfie second "B" component being of one-half magnitude.
The output of the multiplcxer 210 is arithmetically combined with the
value stored within latch 230 during every clock cycle~of the code clock
generator 202,
which is coupled to the latch 230 through AND gate 234. This arithmetic
combination,
consisting of addition or subtraction, is effected using an exclusive-OR (XOR)
gate 240
and a digital adder 2A4. In particular, the ten outputs fmm the multiplexcr
2I0 produced
during a given code clock cycle are XOR'd with corresponding ones of the ten
sign bits
(S) generated during the clock cycle. It is observed that the S bit
corresponding to each
modulation component is equal to the polarity of the local code (0 or 1),
except with
respect to the second modulation component, for which the S bit is of opposite
polarity.
That is, the first (A) modulation component of the "A-0.SB" type
discrimination pattern
is of the same sign as the local code, and the ~cor~d (B) modulation component
is of
opposite sign.
The operation of the latch 230 is controlled by the takeldelete (T~ bit
provided by the code PROM 220. When the value of the T bit is zero, the output
of the
adder 244 is prevented from entering the latch 230. Conversely, when the value
of the
T bit is zero, the output of the adder 244 is acquired by the latch 230. The
identical
sequence of T bit values (0110000000) generated during each code clock cycle
results
in the values from the adder 244 corresponding to the first two modulation
components


CA 02525798 1996-05-24
-a
(i.e., the A and B components) being admitted into the latch 230, and the
values
corresponding to the remaining eight modulation components being prevented
from
entering the latch 230. In this way only the product of the signal 1(t) with
the first and
second modulation oomgonents is accumulated within latch 230, which is
required in
order to effect correlation of the received signal I(t) in accordance with a
"A-O.SB" type
discrimination pattern. The initial "0" bit within the T-bit sequence
(0110000000)
introduces a one-tenth code clock delay in the T bit sequence relative to the
M-bit and
~S-bit sequences (FIG. ~, which is necessitated by the one-tenth code clock
propagation
delay between the muldplexcr 2i0 and latch 230.
~ Although the component discriminator module of FIG. 5 could be
implemented so as to generate modulation components "shifted early" in time by
the
requisite amount (e.g., 1/20 of a code chip), a more practical technique for
effecting this
time shift may be employed. Specifically, if the discrimination patterns are
not "shifted
early" relative to the local clock phase by the component discriminator
module, the
resultant bias error may be removed mathematically in subsequent processing.
Even if
the resultant bias is not so removed, a~ consequent ea~or developed in the
estimated
local clock phase may be immaterial in,many applications.
The discriminator of FIG. 5 may be characteri~d as a "coherent mode"
discriminator, in that it is operative to generate the coherent mode
discrimination signal
D~(r). Those skilled in the art will realize that, with minor modification,
such a
discriminator could be also. be used. to generate the non-coherent mode
discrimination
signal D~,(r) by correlating the Q-cbaimel signal with a selected
discrimination pattern.
Further Description of Code Multhpath Mitigation:
.An importaat.aspect of this invention extends the concept of the narrow
correlator to further reduce the effect of multipath signals. FIGS. 21 and 22
show how
the narrow correlator substantially reduces the effect of multipath signals by
symmetri-
tally limiting the amplitude. of,the error function. .The present invention
derives from the
observation that the only beneficial part of the,ermr. function, after initial
alignment, is
30. . the central linear~.slope regioqof the.code error flnxtion. Having
an.ermr function value


CA 02525798 1996-05-24
-4$-
of zero outside that region would eliminate rather than jest attenuate the
effect of all
multipath signals with a delay somewhat greater than half the width of the
cxntral linear
slope region.
It will be understood that the "cxntral linear slope region" of the code
error function may not be precisely linear in a praotic~l impltion of the
invention.
The term "central linear slope region" will, however, be used in this
description to
facilitate identification of the region of the error function extending on
both sides of the
punctual track point without multipath (402 in FIG. 22C or 402' in FIG. 22D).
To achieve the desired multipath mitigadon effect, in accordance with this
aspect of the invention the narnow E-L window is modified. The modifiod window
is
referred to as a Multipath Mitigation Window (, of which there are several
forn~ts. One example of a multipath mitigation window (MME is shown in FIG.
23,
which corresponds with FICA. 18 for the wide correlator window and with FIG.
21 for
the narrow corrclator window. More specifically, FIG. 23A depicts a segment of
the
received code, FIG. 23B illustrates a puncwal MMW, and FIGS. 23C-23E depict
the
MMW advanced by a half chip, a full chip and 1.5 chip, respectively. The
amplitude of
the MMW has three levels, +~fi, 0, and -1, as shown in FIGS. 23B-23E, or the
inverse
of these levels at code transitions with the opposite polarity. FIG. 23F shows
that this
window creates the same ~l Iinear slope itgizon as the narrow correlator.
However,
after the MMW error function reaches its maximum value in the oentra~l region,
it
returns to zero rather than remaining at that maximum value, as does the
narrow
correlator error function.
For purposes of t'llustration, FIGS. 23A-23F were drawn as if the highest
available clock rate is only five times the code chip rate. As a result, each
of the three
2S segments of the MMW have a width of one fifth of a code chip. By way of
contrast
FIGS. 24A-24C assume that the available clock rate is 40 times the chip rate.
It is
evident that use of a narrower window improves the Code Error Function for
both the
narrow correlator and for the MMW.
With an even higher clock rate, all three segments of the MMW could be
smaller. However, the central segment must remain wide enough to accommodate
most


CA 02525798 1996-05-24
-46-
if not all of the code transition time, which usually is defined by the
receiver bandwidth.
Nevertheless, the two outside MMW segments could be narrower than the central
segment. The objective is to drive the error function to zero as quickly as
possible on
either side of the central linear region. If the two outside segments are
narrower than the
central one, then their amplitudes must be scaled so that the total area of
the three
segments remains at zero.
FIGS. 25A-25F show how the MMW further reduces the impact of
multipath signals. FIG. 25A shows a directly received code segment and FIG.
25B
shows a multipath segment which, relative to the direct signal, is delayed by
one quarter
chip, has half its amplitude, and has inverse polarity. In FIGS. 25C and 25D
are the
narrow correlator window and the MMW under consideration. FIG. 25E plots the
code
error functions obtained with the narrow correlator for the directly received
code and for
the received multipath code, and FIG. 25F plots the same code error functions
when the
MMW is used. The figures show that, although the effect of this multipath
signal on the
track point is attenuated by use of the narrow oorrelator, the MMW eliminates
the effect
altogether. This is because the delayed (multipath) MMW error function has a
value of
zero within the linear ce~al region of the direct signal MMW error function.
FIGS. 23,
24 and 25 together illustrate that multipath response with this MMW is never
worse than
with an equivalent narrow correlator for any multipath signal, and that
multipath signals
that arrive with a delay greater than 1.5 MMW segments (where there are three
.segmcnts.per MMW window) cause no track point error at all. Therefore, this
aspect of
the invention provides a major improvement in code tracking accuracy by
eliminating
the effect of multipath signals that arrive with a delay greater than 1.5 MMW
segments.
FIGS. 23 and 24 also illustrate a problem that arises with use of the
MMW depicted. There. is a half amplitude error function response that occurs
at a one
chip spacing on either side of the central region, and indicated at 410 and
412 in FIG.
23F and FIG. 24C, respectively. This secondary response occurs because there
is a 50
chance that an opposite polarity code transition will occur one chip from the
correctly
aligned code transition. ors a.result,.if the.multipath~signal delay is very
nearly one chip,
then some portion of. its; early secondary response will fall within the
central region of


CA 02525798 1996-05-24
-47-
the direct signal error function and thus affect the track point. Note,
however,'that only
the early secondary response can cause this effect. Because multipath signals
always are
delayed, the late seoondaty respome can twer fall within the central region of
the direct
signal error thnction.
A solution to this problem is illustrated in FIG. 26. FIG. 26A shows a
received code segment that is the same as FIG. 23A. FIG. 25B, similarly, is
the same
as the MMW of FIG. 23B. As with every detection window used to track known
binary
wavcforms, the MMW is press wl~re there are code transitions. This is
consistent with
optimizing the signal to-noise ratio of the tracking process. Tracking
information is
present only at the transitions and not elsewhere. Therefore, to maximize the
information
and minimize the noise allo~inod into the freaking process, windows
classically ocxar only
at transitions, and often they are narrowed to exclude as much noise as
possible.
The seat aspect of the invention to be de~rlbed. is not intuitively apparent
and goes against the conventional wisdom of decades of signal tracking
experience. As
illusrrabai by FIGS. 26C and 26D, this aspect of the invention inquires that
MMWs also
be placed at code clock times where transitions do ~ occur. The examples shown
are
for a negative transition and for a clock time where the code state remains
negative. The
MMW has the opposite polarity at positive transitions and at clock times where
the code
state remains positive. In other words, one implementation of this invention
places an
MMW at every clock time of the code. Hecanse each MMW has an average valve of
zero, it contributes nothing to the error signal unless a code transition
occurs within its
boundaries. The purpose of the MMW at clock times with no trans'ttion is to
cancel the
secondary response (indicatod at 410 and 412 in FIGS. 23F and 24C), which
otherwise
occxirs when the reference code is shifted one chip interval from punctual
alignment. For
the two code segments shown in FIG. 26C, the 5096 probable transitions at one
chip
displacement are of opposite polarity, which cancels the secondary response,
as shown
in FIG. 26E.
To be more precise, the MMWs at nomt<ansitions attenuate the secondary
responses by 1/N, where N is the number of chips in the code. This is because
the
number of transitions in a maximal length code is one more than the number of


CA 02525798 1996-05-24
-48-
non transitions, e.g., 512 transitions and 511 non-transitions in a GPS CIA
code. For
all practical purposes, this difference can be ignored, or one MMW at a code
transition
can be deleted for perfect cancellation.
The main disadvac~ge of having a window at every cluck time is that the
amount of noise energy allowed into the tracking function is doubled without
increasing
the signal content. This results in a 3-decibel (3 dB) reduction of signal-to-
noise ratio
compared with having MMWs only at code transitions. This almost certainly is a
good
'tradeoff for the error function of FIG. 23F, but it is not as vital for the
ermr function
of FIG. 24C. Such tradeoffs must be made for each application of the
invention.
Yet another aspect of the present invention is to minimiLe the impact on
signal-to-noise ratio of having an MMW at every code clock time. This aspect
of the
invention is based on the observation that only the early secondary response
can cause
a multipath tracking error because multipath signals are always delayed
relative to the
direct signal. Therefore, an asymmetric MMW, as shown in FIGS. 27B and 27D,
can
be used. For ease of comparison, the received code segments shown in FIGS. 26A
and
26C are repeated in FIGS. 27A and 27C, respectively. It can be seen that the
MMW
error functions of FIGS. 26E and 27E are identical on the early side of the
central
region, but that they differ on the late side. The asymmetric MMW has an area
which
is 25 9b less than the symmetric MMW, for an improvement in signal-to-noise
ratio of
i.2~dB, and the resultant late side error function response does no harm and
will not
cause multipath error.
.I There is another minor disadvantage to the asymmetric MMW. Because
it is asymmetric, the average value at perfect code alignment is not precisely
zero. This
is because the asymmetric MMW signal product at non transitions must balance
the
asymmetric MIViW signal product at transitions, except that optimal codes have
one more
transition than notHtransitions. .Thus, a bias of 1/(2N) times the maximum
amplitude of
the central linear response of the code error function is created. This is
negligible for
typical codes . with N ~ greater than .1,000 chips, but it can be eliminated
entirely by
deleting . one MMW. at a code transition. :. . ~ . . .
Therefore, ' in accordance .with this: aspect of the invention the inventors


CA 02525798 1996-05-24
-49-
have discovered and defined a class of code tracking windows 'which create'
code error
functions with a value of uro immediately p~ding the ce~al linear region. The
objective is to eliminate the effect of multipath signals on the direct signal
track point
when the multipath delay is greater than one and a half times the width of the
narmw
S central linear region.
Because multipath error is the single largest source of code tracking error
for modern, high precision receivers, the benefit of this invention is to
impmve code
tracking acatracy in general and GPS navigational accuracy in particular. An
important
objective in GPS receiver design is to a~ieve code ttaclong accuracy of better
than nine
oa~metcrs with high pliability (e.g., three sigma). This will allow direct
resolution of
GPS Ll signal carrier phase ambiguities as well as direct resolution of the
ionosphere
free combination of GPS Li atsi L2 carrier phase ambiguities. A number of
significant
benefits will flow from this capability, including:
(I) The ability to use less expensive single frequency (rather than dual
frequeruy) GPS receivers for centimeter aaxuncy surveys and navigation over
distances
of 10 kilometers or more from the base station. (Dual frequency receivers are
used, today
in order to resolve ambiguities in seconds rather than tens of mirrutes
nsnally required
with single frequency receivers.)
(2) The ability to perform centimeter accuracy surveys and navigation with
only four satellites visible instead of the five or more now required to
resolve
ambiguities in an acceptably short time. This will make the use of GPS more
practical
in difficult environments where GPS signals are blocked by terrain and
foliage.
(3) The abifity to perform centimeter acxuracy surveys and navigation over
distances of 100 kilometers or more from the base station by directly
resolving the
ionosphere free combination of GPS Ll and L2 carrier phase ambiguities.
Without this
improvement, the Li and L2 signals are used to form a difference frequency in
order
to achieve more rapid ambiguity resolution with the 86 centimeter wavelength
of (LI
L2). By using code measurements to resolve ambiguities, the Ll and L2 signals
can be
combined to remove ionospheric refraction effects, thus greatly expanding the
radius of
coverage from a base station.


CA 02525798 1996-05-24
-$0-
Phase Muttipath Mftigadon Invention:
(a) Elect of Multlpath on Carrier Phase:
The multipaih mitigation techniques described above significantly reduce the
effect of multipath signals on code tracking accuracy. However, they do not
address the
effect of multipath signals on carrier phase measurements. Therefore, a second
major
aspect of the invention is to extend the multipath mitigation concept to
minimize carrier
phase tracking error due to multipath signals.
FIG. 28A shows a portion of a received code signal with a single transition
and FIG. 28B depicts one example of a corresponding delayed and inverted
muldpath
signal transition. FIG. 28C shows a phase MMW sampler, which has a short
positive
component before the direct signal code transition and a short negative
component
immediately after the direct signal transition but before the multipath signal
transition.
The polarity of each phase MMW sampler component is determined by the polarity
of
the local code at that time.
The phase vectors shown in FIG. 29A show the components of the carrier
signals relative to the numerically controlled oscillator 352 (FIG. 14), at
various times
before and afioer the direct signal code transition. The vector sum of these
vectors defines
the I pun~ual and Q punctual components entering the Costar carrier tracker
354 (FIG.
14). For illustration convenience, the X axis of this figure represents the Q
value and the
Y axis the I value, so that line T represents the average signal phase tracked
by the
Costas , loop over thousands of code chips.
It is important to understand the time scale of these vector diagrams. The
Costar tracking loop of a typical GPS CIA code receiver has a bandwidth of 10
to
2$ Hz. This means that the loop filter time constant is on the order of 40 to
100
milliseconds, which encompasses 40,000 to 100,000 GA code chips. The phase
vectors
of FIG. 29A represent input signals that are being averaged over 40 to 100
millisecond
periods, so they are essentially stationary over the duration of a few CIA
code chips,
which have a period of about one microsecond each. At this microscopic time
scale, the
vectors , are affected only by the code, phase .modulation.. Over longer
periods of time,
e.g., seconds, the vectors will rotate in phase and change in.amplitude
relative to each


CA 02525798 1996-05-24
-S I-
other.
As will be explained, the vector.diagrams of PIGS. 29A and 29B make it
plain that the Costas tracking' loop does not measure the phase of the direct
carrier
signal. It measures the phase of the vector sum of the direct signal plus all
of the
received multipath signals. For GPS receivers used in centimeter aceuaacy
survey and
navigation applications, a few millimeters of error is significant. Because
the GPS Ll
carrier signal has a wavelength of about 19 c~dmeters, every two degrees of
carrier
phase error praduoes a millimeter of iaeasnremeat error. This is why a
reduction in
phase error caused by multipath is an important objective.
With respect to the vector diagram of FIG. 29A, vector D represents the
phase and amplitude of the direct received signal, prior to the code
transition, relative
to the average tracked phase of the Costar Loop, as represented by line T.
Thus, the
phase uacldng error is the an~gutar offset betareen vector D and line T. To
simplify this
analysis, we consider the effect of only one muItipath signal, represented by
vector M.
Thus, vector A, which is the composite signal phase being tracked by the
Costas Loop,
is the vector sum of the direct signal, vector D, and the multipath signal,
vector M.
These three vectors represent the state of the input signals prior to the code
transition,
particularly during interval A of the phase MMW sampler.
This aspect of the invention may be understood by noting what happens to the
signal vectors immediately aRer a direct signal code transition but before the
multipath
signal code transition, e.g.,.during period B of the phase MMW sampler. At the
direct
signal code transition, vector D changes phase by I80 degrees. In fact, this
is the
meaning of a code transition, i.e., the carrier phase is inverted. Thus,
vector -D
represents the phase and amplitude of the direct signal immediately after the
code
transition. Because the multipath signal is delayed by its extra path length,
vector M does
not invert at the dit~ect signal transition, but retains its original pre-
transition direction
until the multipath code transition. Thus, during the interval between the
direct signal
code transition and the multipath signal transition, the composite signal is
represented
by vector B, which is the vector sum of vector -D and vector M. As
illustrated, this is
the status during period B of the MMW. At the multipath signal code
iransition,


CA 02525798 1996-05-24
-52-
vector M is inverted and becomes vector -M. The vector sum of vector -D and
vector -M is vector -A, which, as expected; is the inverse of vector A.
It will be recalled from the discussion of FIG. 14 that the signals entering
the
Costar Ioop are multiplied by the local pun~al code. When the Iocal code
changes state,
all signal vectors entering the Costas loop are inverted. In other words,
after the local
code transition, vector A is inverted to become vector A, and vector -B is
inverted to
become vector B. Thus, the signals actually entering the Costas loop are as
illustrated
'~ by the solid line vectors in FIG. 29B. They also illustrate the vectors
observed by the
phase MMW sampler, because the polarity of each phase MMW component is defined
by the polarity of the local code during that component. Most of the time, the
signal (D)
and multipath (Nn vectors sum to vector A. However, during the brief interval
just after
the direct and local code transitions but before the multipath code
transition, the vectors
sum to vector B. When the multipath code transition occurs, the signals again
sum to
vector A. This diagram also explains why vectors A and Line T are not better
aligned.
For the example shown, the Costar Loop sees vector A 959b of the time and
vector B S
of the time. Therefore, the phase being freeload, as indicated by Iine T, is
biased slightly
away from vector A toward vector. B. More importantly, the desired phase
measurement
is the multipath-free angle of vector D.
The key observation from FIGS. 29A and 29B, and the basis for the phase
multipath mitigation aspect of the invention, is that the vector average of
vector A and
vector B is voctor D, which is the direct signal phase vector without
multipath distortion.
This observation shows that it' is possible to determine the direct signal
phase by vector
summing ihe.composite phase vector before any transitions with the composite
vector
immediately after the direct transition but. before the multipath signal
transitions.
Although this observation is illustrated with only one multipath signal, the
principal of superposition holds that.the observation applies equally well to
any number
of multipath signals. Therefore, performance of this invention is not
determined by the
number, or relative amplitude, or relative phase of the multipath signals. The
only
performance limitation.is the need to observe phase after a direct signal code
transition
but before the multipathaignal codearansition(s), such as during period B' of
the phase


CA 02525798 1996-05-24
-53-
MMW sampler in FIG. ~. 28C. Therefore, this invention cannot mitigate phase
ermr
caused by multipath signals with a ~ delay so short that the phase vector
between
transitions cannot be observed. Other techniques must be used to combat such
multipath
signals. However, the eveness of the present invention can be enhanced by
antenna
placement strategy. For example, by placing the antenna on a tall mast, it can
be
removed sufficiently from reflecting objects that the present invention is
more effective
than it would be for an antenna placed near the reflecting objects.
(b) Implementation Issues:
There are two key implementation issues for the phase multipath mitigation
aspect of the invention. The first is to establish where the samples should be
taken. The
second is to evaluate whether the measurements will have an adequate signal-to-
noise
ratio.
Although FIG. 28 suggests that phase sample points could be immediately
before and afoer a code transition, these are not the optimum locations. The
reason is that
multipath signals with approximately a one chip delay will cause correlated
transitions
to occur between periods A and B, thus introducing an error. Therefore, for
essentially
the same reason that it is desirable in code tracking to place code MMWs at
every code
clock time, whether there is a transition or not, it is best to place a phase
sampling
window just after each code clock, as illustrated in FIGS. 30A-30D. In FIGS.
30B and
30D, phase MMW samplers are placed immediately after each code clock, and the
polarity of each sample corresponds with the local coda at that time. In FIG.
30B, the
phase MMW sampler immediately follows the negative code transition shown in
FIG.
30A. In FIG. 30D, the phase MMW sampler is in the same position relative to
the code
clock, but here it samples the signal shown in FIG. 30C where the code remains
negative
and does not transition. Each interval A occurs just after a code clock with
no transition
and is in the same location relative to the code clock as each interval B,
which closely
follows a code transition. Interval A measures the composite phase before a
transition
occurs, and interval B measures the composite phase immediately after a code
transition.
Because all interval A and interval B windows occur at the same position
relative to a


CA 02525798 1996-05-24
-54-
code clock, the effect of multipath transitions delayed into these windows is,
on average,
the same for each. However, the SOY probable preceding code transitions have
opposite
polarises, which cancels the effect.
The vector diagram of FIG. 31A represents the received signals during
interval A of FIG. 30D, and the vector diagram of FIG. 31B represents the
received
signals during interval B of FIG. 30B. Because these figures happen to
illustrate a
negative code polarity at both tips, the signal vectors are shown with
negative polarity.
If the code polarity were positive, the vectors would be inverted, as would
the polarity
of the phase MMW samplers. The vector diagram of FIG. 31C represents the
signal
during interval A multiplied by the polarity of the interval A phase MMW
sampler and
the signal during interval B multiplied by the polarity of the interval B
phase MMW
sampler.
It is evident that the voctor sum of vecoor A with vector B provides the phase
of vector D, i.e., the direct signal phase unaffected by multipath error. In
practice, of
course, the summation talaes place over a large (and number of intervals A and
B. The vector sum is formed by summing the I cod of the signal sampled during
intervals A with the I components of the signal sampled during the same.
number of
intervals B and by summing the Q components in the same way. The summed I
components and the summed Q components form the I and Q components of the
vector
20 ~ sum. The number of inoervals used for each summation is chosen to balance
the need for
w a good signal-to-noise ratio and the hoed to track multipath phase dynamics,
as discussed
below. (To retain amplitude information, and depending on the particular
implementa
tion, it may be preferable to employ a vector average, i.e., the sum divided
by the
rnimbcr of inputs, or, alternatively, a veroor exponential filter.) The
result, as illustrated
in FIG. 31C, is a measure of the angular offset of Vector D from the irac~ang
reference,
Lure T. This is the Costas loop phase traciar~g error due to multipath signals
delayed past
Interval B. ..
The second implementation issue is the signal-to-noise ratio of the measure-
ments. For this purpose,-, interval B . should occur as soon as possible after
the code
transition, with sufficient delay to account for code tracking error and the
finite code


CA 02525798 1996-05-24
-55-
transition time caused by signal bandpass filtering. After this delay,'
interval B should
be as narrow as possible to minimize the number of muItipath transitions which
might
occur before it ends. In practice, these limits are oRen determined by the
maximum
clock froquency usal to drive the digital processing functions. For example, a
practical
GPS receiver might employ a 40.92 MHz digital clock, which creates 40
intervals of
approximately 24.4 nanoseconds each within a' CIA code chip and 4 within a P
code
chip. With this clock, the phase MMW samplers of FIGS. 30B and 30D could be as
narrow as 0.025 (1/40) of a CIA code chip. Therefore, the signal energy
processed
during either interval A or interval B is 0.025 times the energy processed
during an
entire CIA code chip, which results is a signal-to-noise (S/I~ power reduction
of 16 dB.
Fortunauly, this lb dB SIN loss can be compensated by vector summing,
averaging, or filtering the sum of interval A and interval B measurements over
longer
time periods. For example, assume that the Costas loop has a relatively narrow
10 Hz
bandwidth, and thus an averaging time of about 100 milliseconds. By vector
averaging
the sum of imerval A and B measurements for four seconds, i.e., 40 times as
Long, the
S/N ratio of the multipath phase error measurement will be equivalent to the
SIN ratio.
of the Costas loop.
Even more fiher'tng is practical for two reasons. First, the most troublesome
multipath signals have maximum phase rates, relative to the direct signal, of
a few cycles
per minute. Therefore, filtering with a time constant of mater seconds is
practical.
Seoond, for static survey applications, high rate multipath signals are
quickly averaged
out by subsequent processing, so they cause no position offset. This example,
using a
40.92 MHz clock to drive the signal processing functions, shows that it is
practical to
dezermmc and thus to remove multipath phase rant using a measurement intervai
of 25
nanoseconds located just after the filtered direct signal code transition is
complete. The
time delay from the code track point for the filterod transition to complete
before starting
the measurement is determined by the overall rxeiver filter bandwidth. For
example,
with a typical two-pole, 18 MHz bandpass filter, the delay should be about 25
nanoseconds.
In summary, this aspect of the invention pertains to the removal of much of


CA 02525798 1996-05-24
the phase error caused by multipath signals. The technique is to sample the
incoming
composite signal at points far from code transitions and at points immediately
after code
transitions. The vector sum of these samples produces a vector representing
the direct
signal without interference from those multipath signals, which are delayed
beyond the
samples taken just after the code transitions. The optimum point to sample the
signal far
from code transitions is just after a code clock where no code transition
occurs, in the
same position relative to the code clock as the samples just after a code
transition.
Because multipath error is the single largest source of phase tracking error
for modern, high precision raxivers, the bereft of this.invention is to
improve phase
tracking accuracy in general and centimeter level GPS survey and navigation
accuracy
in particular. In addition, the reduction of phase measurement uncertainty
will permit
faster resoludpn of phase ambiguities, which is required before centimeter
accuracy
survey or navigation can begin. The reduction of phase measurement uncertainty
further
enhances the potential for more accurate code measurements to provide direct
resolution
of cycle ambiguities. The overall result will be better accuracy and higher
productivity
of survey and high precision navigation systems.
Implementation Examples:
FIG. 32 provides more detail on the digital processing portion of FIG. I4,
together. with the additions required to implement both components of the
multipath
mitigation invention. Only one channel is shown. The heavy line 420 on the
left of the
figure represents the bus that provides common samples of the incoming signals
to every
channel. The heavy line 422 on the right represents the bus that distributes
common
clock signals to all channels.
Note that each receiver channel processes the signal samples in three
different
ways. ,The center section of the figure is used to track composite carrier
phase. The
signal samples are multiplied by (correlated with) a continuous punctual code
supplied
by a PRN coder 424 to. remove the incoming code transitions. Neact, these
samples are
multiplied by (correlated with) I and Q reference signals from the NCO 426 to
produce
baseband I and Q components,called h Punctual and Q Punctual. These signals
enter a


CA 02525798 1996-05-24
-57-
Costar carrier phase, tracker 428, which locks.the frequency, and the phase of
the NCO
426 to the incoming signal. The Q Punctual signal is need ~as the tracking
error signal,
so it is minimized by the tracking process. As a result, the amplitude of the
I Punctual
signal is maacimized. . . '
' Because of data modulation, . I Punctual will switch between positive and
negative values in response to the polarity of the data modulation. Well known
techniques are used to track and align signal integrators with the data bits.
Thus, tire
I Punctual signal is irnegrated over each bit interval to determine the
polarity of each
received data bit. This process provides the message data output of the Costar
carrier
iraclaer 430. Hax~use of the cross nmltiplication within a Costas loop, the
loop will lock
and track successfully at either zero or 180 degrees of input phase, and each
of these
tracking points produces an opposim polarity of the I Punctual signal. Thus, a
bit
sequence of 101011 may be demodulated as 101011 or as 010100, depending on the
phase tracking point of the Costar loop. Message content must be used to
resolve the
IS actual polarity of the demodulated data bits.
The lower section of FIG. 32 is used to acquire and track the pseudorandom
code. Initial acquisition way be performed with a wide correlator early minus
late
window, such as that illustrated in FIG. 18. Nfter initial acquisition,
tracking will be
performed with a multipath mitigation window such as those illustrated in
FIGS.
23, 26 and 27. The code MMW multiplies (correlates) the input signal samples,
which
are then multiplied by (correlated with) the I and Q Reference signals from
the NCO
426. The results are the I,,,~" and ~,n,,q, signal components.
When the Costar loop is phase locked to the signal, both the Q Punctual and
the Q,~, signals are miaimized. Under this condition, it is practical to
employ only the
IM",~ signal to drive the Code Tracker function. The amplitude of they",
signal is a
function of the offset betvvcen the received code and the local code, as
illustrated by the
code error funetior~s of FTGS. 23 through 27. However, the polarity of the
I",~,r, and
Q,~, signals is affected not only by the dirxtion of code error but also by
the polarity
of the current data bit. To eliminam this problem, the Ice, signal (and the
Q,~, signal
if desired) is integrated over each data bit interval, and the integration
result is then


CA 02525798 1996-05-24
-5$-
multiplied by the corresponding demodulated message data bit from the Costar
loop.
Having beg recdfied by the data bit, the individual integration vaults may be
coherently
added to achieve filtering.times as long as desired. The code tracking loop
adjusts the
time phase of the PRN Coder to null the error function, i.e., the amplitude of
I,,,~.
By using one of the code multipath mitigation. windows rather than a
comr~tional early minus late window, either wide or narrow, the effect of any
multipath
signal which is delayed beyond the MMW is eliminated. As a result, code
measurement
error is significantly reduced.
In addition to I,,n,,w , Q~ , and message data, the cede tracker 430 of FIG.
32 also receives I Punctual and Q Punctusi inputs. With these, the code loop
can be
enabled before the Costar loop is locked, i.e., while there is a frequency
difference
between the signal and the NCO. In this case, the code error function is
formed by
summing the product of the two I signals with the product of the two Q
signals. The
result is a scalar value with amplitude corresponding to the code error
function
multiplied by the code autocorreladon function. This is because code offset
affects the
amplitude of I and Q Punctual in accordance with the autocorreIation function
of FIG.
7G. Also, because of the products, the amplitude of the code error function
will change
as the square of the input sig~l amplitude. Any form of analog, digital, or
mathematical
gain contml can be used to compensate for this effect.
~ The top portion of FIG. 32 relates to the phase multipath mitigation part of
this imrernion. The purpose of this section is to determine the phase offset
of the direct
signal relative to the phase being iraclaed by the Costar loop. For this
purpose, the signal
samples are multiplied by (correlated with) the phase MMWs defined by FIG. 30B
and
30D as Intervals A and B. The result is thea multiplied by (correlated with)
the I and Q
Reference signals from the NCO 426 to produce I~ and Q; baseband components of
the
composite signal being raxived during each sample interval. With reference to
FIG. 31,
these h and Q,, baseband signals define Vector A during Intervals A and Vector
B during
Intervals B. The vector average of these measurements over marry Intervals A
and
Intervals B requires only that the I~ values and the Q, values be separately
averaged.
~ The I4 and Q, averaging :intervals must be aligned with the message data
bits,


CA 02525798 1996-05-24
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because the polarity of the Is and Q4 signals are modulated by the current
message data
bit. Therefore, the Ii and Qø values are summed or averaged over each data bit
interval,
and the results are rectified by demodulated message data bits from the Costas
Loop. The
rectified sums or averages then may be further summed, averaged, or filtered
to achieve
the desired signal-to-noise ratio. For a ~ GPS ~ C/A code reviver, there will
be 20,460 It
and Qi measurements per data bit inoerval to be averaged. ARer rectification
by the
demodulated message data bit, these average values are available at a rate of
50 per
second for further filtering.
To evaluate the filter requirements, begin with the assumption that the total
signal strepgth is a moderately low 40 dB . Assuming that the signal
processing functions
are clocked at 40.96 MEIz, there will be 40 signal samples per CIA code chip.
Thus, the
minimum width Phase MMW sample consists of one signal sample just following
each
CIA code clock. This represents a worst case SIN power reduction of I/40, or -
I6 dB.
The equivalent phase cimr C/No therefore will be (40 - 16) = 24 dB. To achieve
a
phase measurement accuracy equivalent to one millimeter with the 19 centimeter
Li
signal wavelength requirGS a SIN of 29 dB. Therefore, a filter time constant 5
dB longer
than one second, or about 3 seconds, is adequate to achieve this accuracy and
is entirely
practical for the multipath phase rates of interest. In fact, the filter time
constant may
range from 4 to 20 seconds, depending on the application and the order of the
filter. In
a~ event, the filtered I and Q values are used to calculate the phase offset
of the . Costas
Loop caused by multipath signals.
The phase correction process may be implcmin the phase calculation
box 432 in a number of ways. One is simply to calculate the arctaagent of the
filtered
phase correction I and Q values to determine the pha~ error and apply it
mathematically
as a oorrxtion to normal phase measut~e~s from the Costas loop. Another is to
add
an appropriate function of the filoered phase correction Q valve to the Q
Punctual signal
entering the Costas carrier tracker 428 so that the Costas loop drives the
filtered phase
oornection Q value to zero. In this way the normal Costas loop phase
measurements will
be free of most multipath error. U~oubtedly there are many other
implementation
techniques, but the underlying concepts of measuring and compensating for the
phase


CA 02525798 1996-05-24
error effects of multipath signals are the same.
Multipath Mitigation in the Presence of GPS Ant;-Spoofing:
.As explained in the aforementioned patent to Keegaa (U.S. Pat. No.
4,972,431), it is more difFcult to obtain measurements from GPS satellites
when the
satellite P code is en~crypbed inDo a Y code to prevent spoofing of GPS
signals. However,
Keegan has shown that ba~use the Anti-Spoofiag (AS) encryption rate is
appmaimately
five percent of the P code clock rate, i.e., nominally 500 kHz, processing of
the
encrypted signals can be enhanced by first correlating with the P code to
reduce signal
bandwidth from appmxirostely t 10 MHz to approximately 1500 kIiz. This 20-to-1
bandwidth r~uCtioa before further processing results in a 13 dB improvement in
signal_
to-noise ratio. Two United States patents, Keegan (4,972,431) and Lorenz et
al.
(5,134,40, descn'be xveral methods for achieving these benefits.
FIG. 33 illustrates one of several ways to achieve the mitigation of multipath
effects for both code and phase measurements in the presence of Anti-Spoofing.
This
implemernration also can be used when AS is not present. As in FIG. 32, there
are three
signal processing axtions. The first correlation step for each is the sumo as
is FIG. 32,
namely correlation with the punctual code.for carrier tracking and data
demodulation,
correlation first with an E-L code for initial code acquisition and they with
the code
MMW for code tracking, and con~elation, with the phase MMW sampler in order to
...
determine the phase error due to multipath signals. In FIG. 33, the second
step of
correlating with the I acrd Q Reference signals from the NCO 426 also is the
same for
all three sections. Note that the scqucace of .these Rmctions can be changed,
e.g., I and
Q correlation prior to code correlation, or the fractions can be combined,
without
affecting receiver performance.
The first major difference between the method of FIG. 32 and of FIG. 33 is
the addition of a signal Integrate and Dump (I/D) fuaMion following
correlation with
each I and Q Reference signal. As shown, ail of the I/D functions are
controlled by an
AS clock signal on line 440 from the PRN eoder 424. As described in Lorenz et
al. (US
30~ S,134,407~, the exact earxyption code ~elock function has been determined
from analysis


CA 02525798 1996-05-24
-61-
of receivod GPS satellite signals, and it is easily recreated as part of the P
code PRN
coder 424 logic design. (Note that this information does not reveal the
encryption code
nor allow its prediction. It only defines the location of encryption code
clocks with
respect to the known P code.) Therefore, the AS clock signal on line 440 in
FIG. 33
causes each input signal to be integrated during each chip interval of the
encryption
code, which is terminally two miaosxonds. At the tnl of each encryption chip
iaterval,
the previous integration result is output, the integrator is set to zem
(dumped), and
integration for the neat encryption chip interval begins. This process is
necessary
because the encryption code is unknown. Therefore, the longest possible
coherent
inoegration time is the encryption chip period. The bandwidth of the signal
samples after
the I/D function is ~minally 500 kHz, and the SIN ratio of the samples
correlated with
the punct~~al code is typically negative by 6 to 26 dH.
There are three ways to track the frequency a~ phase of an AS encrypted
signal: squaring, cmss-correlatioa, and squaring with emss-correlation to
resolve half
cycle ambiguities. FIG. 33 shows the squariag approach in the ceatral section,
which
includes a vector squaring logic 442. The Ip and Qp signals represent a phase
vector
(Ip + jQp ), where j defines the imaginary or quadrature axis with a value of
~.
Because the polarity of Ip and Q p depend on the unknown encryption code,
something
must be done to rectify these signals in order to produce a coherent signal
which can be
measured. The vector squaring approach multiplies each vector obtained from
the I/D
circuits by itself, i.e.,
~Ip + .lQp)Z - l~P QP) + O2lpQp)
as indicated in FIG. 33. Because I and Q are the cosine and sine components,
respectively, of the same input signal, we can write:
Ip = A cos~p and QP = A sin~o,
where ~p is the phase difference between the input signal and the NCO
reference signal
and A is the vector amplitude. Substituting these into the preceding equation
and making
use of trigonometric identities yields:
(tA cos~p tjA sin~p)= = Az cos2~p + jA~sin 2~p.


CA 02525798 1996-05-24
-62-
There are three key characteristics to observe, one is amplitude, the second
is data modulation, and the third is phase. Regarding amplitude, the vector
squaring
produces an output vector amplitude which is the square of the input vector
amplitude.
This means that the output signal-to-noise ratio is approximately the square
of the input
signal-to-noise ratio. For example, if the input SIN were 0.5 or -3 dB, the
output SIN
world be no better than 0.25 or -6 dB. Similarly, if the input SIN were 0.25
or -6 dB,
the output SIN would be 0.0625 or -12 dB. Not only is the output SIN made
worse, it
drops by 2 dB for every 1 dB decrease in input SIN. The only way to compensate
for
such losses is to employ extended filtering times.
The second characteristic to note is that the squaring pnocxss not only
eliminates the biphase modulation caused by the encryption code, but it also
eliminates
the data message biphase modulation. Therefore, it is not possible to obtain
the data
message from this channel.
The third characteristic is an output phase rotation rate which is twice that
of
IS the input vector. This means that a phase tracking loop can lock the NCO
426 to the
input signal at nominally zero degrees of phase difference or at I80 degtres
of phase
difference. This characteristic it:troducGS a half cycle ambiguity in the NCO
phase,
which can be resolved in several ways, as descn'bed, for example, by Lorenz et
al.
(US 5,l34,40Tj.
The poor SIN ratio of the resultiQg measurements makes it difficult to
implement a phase locked loop capable of tracking signet dynamics when the
received
signal is weak. Such a loop requires a double sided bandwidth of at least 20
Hz, and the
SIN into the loop should be + 10 dB or better for reliable and low noise
tracking.
Fortunately, AS encryption is applied only to the GPS P codes. Therefore, an
Ll ClA
code signal is available~from every GPS satellite. This permits the receiver
to gather the
message data and to track signal dynamics with the Ll CIA code signal. Because
all GPS
signals.are derived ftnnn a single satellloe clock, the only phase and
frequency difference
between the. received . L2 carrier signal and 60/77 times the Ll carrier phase
and
frequency (60/77 is the L2JL1 frequency ratio) is due to ionospheric
refraction and
multipath, both of,. which change slowly. For .example, typical ionospheric
refraction


CA 02525798 1996-05-24
-63-
rates are on the order of a cycle per minute. Therefore, as indicated in FIG.
33 and
explained by Keegan (US 4,972,431), the NCO 426 on an L2 channel can lx driven
(track-.aided) by signals from the corresponding LI CIA code channel. This
will remove
all but the slowly varying ionospheric and multipath phase differences between
the Ll
and L2 carrier signals, as also descn'bed by Keegan (US 4,972,43I).
With most of the signal dynamics removed by track aiding, the L2 carrier
phase tracker can employ a very narrow filter bandwidth to achieve an adequate
SIN.
For example, if the L2 GPS CINa were a very weak 30 dB (C/1Vo is the SIN in a
one
Hertz barxiwidth), the SIN fiom the AS IID, which has an equivalent bandwidth
of 500
IO kHz, would be (+30 - 57) or -27 dB. (Other implementation losses occur,
which will
be ignored is this analysis.] After voctor squaring, the SIN ratio will be -54
dB. To
achieve a +IO dB SIN ratio from such samples raquirGS a bandwidth reduction of
64 dB,
or 2.5 a 106, which yields a required double-sided tracking bandwidth of 0.2
Hz, or
0.1 Hz single-sidod. Experience shows that filter time constants of more than
14 seconds
are practical when tracking ionospheric and multipath effects. Thus, the phase
tracker
in the central section of FIG. 33 is able to drive the track-aided NCO 42b to
close the
loop and track the incoming L2 carrier signal with low phase error. Note that
the
preceding analysis began with a very weak C/No of 30 dB. In general, GPS
signal C/1Vo
values range between 40 and 50 dB, so the very narrow bandwidth is needed only
to
track the weakest of signals.
The lower portion of FIG. 33 shows that after initial code acquisition with a
wide cotTelator E-L window, the code can be tracked with a code MMW to
minimize
the effect of multipath signals on code tracking accuracy. Assuming that the
signal
processing functions are clocked at 40.96, MHz, there will be four signal
samples per
p code chip. Each asyn~ric MMW will employ two signal samples per chip, the
first
one nearest each code clock and the second o~ immediately after the first.
Recall that
these are of opposite polarity and that the first has double the weight of the
second, in
accordance with the definition of FIG. 27B. Only these two signal samples will
be
allowed through the MMW to correlate with I Reference and Q Reference. The
result
of these correlations are summed over the Anti Spo~ftng interval to produce Ic
and Q~


CA 02525798 1996-05-24
measurements. To rectify the unknown polarity of these measurements, caused by
the
encryption process, they are multiplied, rapeCtively, by the corresponding IP
and Qp
signals from the carrier tracking section. When the Cosine loop is locked, the
value of
Qp and of Q~ will be minimized. Therefore, the product I ~ I p can be used
alone as the
code error function. Because of the product, it has a squared signal amplitude
and the
shape of the code error function of FIG. 27E multiplied by the autocorrelation
function
of FIG. 7G.
The top portion of FIG. 33 shows how the phase error due to multipath
signals is determined. Assuming that the signal processing functions are
clocked at
40.96 MHz with four samples per P code chip, the Phase MMW consists of one
sample
immediately following each P code clock, the polarity of which is determinal
by the
P code state at that time. Using one sample out of four reduces the SIN ratio
by 6 dB.
Because anti-spoofing limits the maximum coherent signal integration time to
the AS
encryption chip period of about 2 microseconds, and because the polarity of
the result
is unpredictable, the I, and Q4 values must be vector squared to produce~I and
Q terms:
I~2 - Q d2 and 2Im Qb ,
which represent the second harmonic of the phase error. If the input C/No were
a
moderately low 40 dB, the SIN ratio of I~ and Qo would be (+40 -57 -6) = -23
dB.
After squaring, the SIN would be -46 dB. Therefore, the squared vector
components
must be filtered with a time constant of 63 seconds to achieve the 29 dB SIN
ratio
required for one millimeter measurement accuracy. In this case it is evident
that some
compromise is necessary between measurement accuracy and response to rapidly
changing multipath. Depending on the application requirements, practical
compromise
values are possible. As with FIG. 32, the I and Q phase error terms may be
processed
in a number of ways, including calculation of the an:tangent to measure the
error and
mathematically apply it as a correction, or injecting an appropriate function
of the Q
term into the phase tracker to cause the NCO 426 phase reference to align with
the direct
signal by driving the 2I,Qa term to zero on average.
FIG. 34 shows an alternate way to measure the muldpath phase error. Instead


CA 02525798 1996-05-24
-6s-
of vector squaring the outputs of the AS UD to rectify the unknown encryption
code, as
in FIG. 33, the outputs are each multiplied by the equivalent Ip value from
the carrier
phase tracking section, which also rectifies the measurements. However, as
will be
discussed in the following section, the ip values ate based on at least two
signal samples
per P code chip, so they have a better SIN ratio than the h and Q~ values,
which have
only one sample per chip. Because squariag is avoided, the measurements
represent the
fundamental rather than the second harmonic of the phase error. Comparative
tests of
the two methods will determine which is better for a particular application.
Special Signal Processing Considerations:
Certain special considerations are requited for receivers which process
encrypted GPS signals, such as those illustrated by FIGS. 33 and 34. Whenever
the
product of two signals is required, it is important to avoid the introduction
of bias terms
by multiplying identical noise samples. For example, in FIGS. 33 and 34
consider the
product (Ic Ip) which is one input to the code tracker 430. Assuming a signal
sampling
rate of about 40 MHz and an AS integrate period in the AS IlD of about two
microseconds, there will be up to 80 signal samples contained in the term Ip.
Assume
also that the MMW consists of two signal samples per bit, the first with unit
weight and
the second with opposite polarity and 50% weight. Therefore, the term h will
contain
about 40 samples, half of which will have an inverted polarity and a 50%
weight. Each
of these h samples has a corresponding sample in Ip . Because each signal
sample quanti-
Ftes both signal and noise, half of the sampled noise in h corresponds exactly
with the
corresponding samples in IP. The result is a squared noise term which results
in a
significant bias. The other half of the samples in I~ also correspond exactly
with samples
in Ip, but the product produces a negative bias of half the magnitude. There
are two ways
to eliminate the bias. One is to delete all samples in IP which cotrespomi
with samples
in I~. In this example, ~, would then receive only two of every four signal
samples,
presumably reducing its SIN ratio by 3 dH. The other way is to weight the I
signal
samples which correspond with the unity weighted MMW samples by 50fo. In this
way
the positive and negative bias values will exactly cancel each other, and the
SIN ratio


CA 02525798 1996-05-24
-66-
of Ip presumably will be reduced by only 0.6 dB.
Although the second approach would appear to be preferable, other subtleties
of the process affect the result. The signal sample corresponding with the
first section
of the MMW is c~ered on a code transition. Therefore, the average signal
component
at that point is zero, and removing that signal sample from Ip removes only
noise and
no signal. As a result, removing both samples from Ip only reduces its SIN by
0.51 dB.
(3.SI dB of actual signal reduction but 3.0 dB of noise reduction.) Keeping
all four
samples but weighting one by 5096 actually further reduces the SIN ratio by an
additional 0.49 dB. Optimum performance always requires very careful system
design.
Note from FIGS. 33 and 34 that signaI.produets occur in many ptaees. For
each one, a strategy must be implemented to eliminate bias terms. Fortunately,
the
vector squaring process does 'not have this problem even though, for example,
the
component:
\iP QP
contains two squared terms in which every included signal sample is muItiptied
by itself.
In this case, the bias in one squared term is canceled by an identical bias in
the other.
Although these subtleties~are not part of the subject invention, they serve to
show the complexity of the actual design. Fortunately, the basic principles of
this
invention are clear and are. not obscured by the implementation details.
illustrative PRN Coder:
FIGS. 32, 33, and 34 illustrate receivers designed to minimize multipath
interference in measuring code and carrier phase. In each of these figures,
the code
MMW, the phase MMW, and the punctual code signals are shown to be generated by
a PRN coder 424. FIG. 35 is a logic diagram of one such PRN coder. For
purposes of
illustration, three key simplifications have been made. First, a very simple
15-chip code ---- -
generator is shown. Second, the timing is based on four signal processing
clocks per
code chip, which may be typical when tracking the GPS P Code but not the C!A
code.
Finally; generation of.~only . the ~ code MMW waveform illustrated by FIG. 37D
is
illustrated.


CA 02525798 1996-05-24
-67-
FIGS.. 36A-36I show the timing ~rtlationship of the signals' gel by the
logic of FIG,. 35. The receiver clock is the clock signal distributed to all
receiver
channels by the vertical bus 422 in FIGS. 32, 33, and 34. As shown, this
signal
establishes the nominal clock rate of each NCO 426. These figures also show
that the
PRN coder 424 is driven by the output of the NCO 426 and by the output of the
code
tracker 430. In FIG. 35, the NCO 426 and the code tracker 430 are shown
providing
inputs to a programmable divider 500 in the PRN coder 424. The pmgtammable
divider
nominally divides the receiver clock by four. However, by controlling the
divider 500
~ divide by three or by five, the NCO 426 and the code tracker 430 cause the
outputs
of the divider to shift earlier or later in time, in increments of one
receiver clock cycle.
This is how the NCO 426 and the code tracker 430 control the time phass of the
PRN
coder 424.
FIG. 35 shows that the programmable divider provides two outputs referred
to as Clock 0 and Clock 1, the waveforms of which are depicood in FIGS. 36C
and 36D,
respectively. The frequencies of the Clock 0 and Clock 1 signals are one half
and one
fourth of the receiver clock frequency, respectively. The im~erted Clock 1
output clocks
a four stage shift register 502, which is a conventional PRN code generator.
As shown
in FIG. 35, the shift register input is the EXCLUSIVE OR of the last two shift
register
. stages. The resulting ~15-chip code IS shown in FIG. 36G. Below the PRN
code, in
. FIGS. 36H and 36I, arc shown the desinod code MMW and phase MMW waveforms.
Based on the simplifying assumptions, it can be seen that each active segment
of these
NINIW waveforms oxurs in the first half of each PRN code clop. The first of
these two
time segments, called State 0, is formed as the logical AND of the inverse of
both
Clock 0 and Clock 1, in AND gate 504. The second segment, called State I, is
formed
as the logical AND of Clock 0 and the inverse of Clock 1, in. AND gate 506.
Waveforms for the State 0 and State 1 signals are shown is FIGS. 36E and 36F,
respectively.
By logically combining State 0 and State 1 with the punctual code generated
by the shift register 502, and its inverse, six control signals are generated.
The logical
combinations are effected by six AND gates 508, 510, 512. 514, 516 and 518.
FIG. 35


CA 02525798 1996-05-24
-68-
labels each control signal to correspond with a particular segment of the code
MMW or
the phase MMW wavcforms. Specifically, for the code MMW there is a large
positive
segment, a large negative segment, a small positive segment and a small
negative
segment. Similarly, for the phase MMW there is a positive segment and a
negative
segment. It can be seen how these code components could be logically combined
to
obtain the rtquired waveforms of FIGS. 36H and 36I, but a practical
implementation
would probably not combine.the MMW componerts in this way.
FIGS. 32, 33, alai 34 indicate that the code and phase MMW waveforms
multiply the incoming sigtral samples in a fast oontlation step. Although this
accurately
represents the signal processing concept, the actual digital implementation is
somewhat
difFerart. The I Reference and Q Reference signals which multiply the incoming
signals
in the second correlation step are numbers obtained from cosine and' sine
lookup tables,
rapeetively. In fact, there are two cosine and two sine tables, one with a
scale factor
twice the other. Thus, when the large positive code MMW control signal from
the PItN
coder 424 is true, the input signal sample is multiplied by the larger cosine
and sine
values. When the large negative code MMW control signal is true, the i~ut
signal
sample is multiplied by the inverse of the larger cosine and sine values. When
the small
negative code MMW is true, the input signal sample is multiplied by the
inverse of the
smaller c~ssine and sine values, and so forth. Thus, the sia control signals
define the
polarity and the amplitude of the cosine and sine values used for each signal
sample.
When none of the control signals are true, the corresponding signal samples
are
discarded and not processed. This is the same as multiplying them by um.
UnLilx all previous taming diagrams, FIGS. 36A-36I show the leading edge
of each PRN code chip (FIG. 36G) aligned with tts; leading edge of the code
MMW
(FIG. 361Tj. This intentional advance of the code phase is not harmful, , and
it simplifies
the logic.. To clarify the ef~tive tuning, note that the signal samples shown
in FIG. 36A
are aligned with the center of the first segment of the code MMW in FIG. 36H.


CA 02525798 1996-05-24
-69-
Summary:
There are many ways to track PRN modulated signals. This section has
illustrated a few of the methods. The current invention is not restricted to a
particular
receiver co~gurgtion. The essence of the code tracking portion of the current
invention
is a family of novel code tracIdag windows which cause the code error function
to have
a value of zero just before, and much closer to, the cemral tracking region
than is
possible with a conventional narrow correlator window. (Note that although a
value of
zero is optimum, this invecgion coverts any waveform which reduces the
amplitude of the
early portion of the code error function relative to what would be possible
with a narrow
corrciator using equivalent signal processing clock rates.) This
characteristic elimimtes
code ttacldng error from multipath signals with sufCxient delay that the zero,
or reduced
amplitude portion, of their code error function falls on the cxntral tracking
region of the
dhrct signal code error function. Note that by reducing the width of a narrow
correlator
window, the effect of these muldpath signals can be reduced. however, the
current
invention permits the effect of these multipath signals to be eliminated
entirely.
FIGS. 37A-37E illustrate some of the wide variety of code multipath
mitigation windows which achieve the desired rewlt. FIG. 37A represents four
segments
of a PRN rode, each centered on a code clock, which, from left to right, shows
a
positive non-transition, a negative code transition, a negative non-
transition, and a
positive transition. FIG. 3?B shows a s3nnmetric code MMW occurring only on
code
transitions, as first shown in FIG. 23B. (the specific polarity relative to
the transition
direction is the designer's choice, as Iong as the polarity is different at
positive and at
negative ions.) FIG. 37C shows a symmetric code MMW occurring at every code
clock, as first shown in FIG. 20D. This elm the half amplitude code error
function
response at plus and minus one chip from the central region. FIG. 37D shows
the
asyrnmetcic code MMW first shown in FIG. 27D, which, by reducing the MMW arcs,
improves the tracking loop signal-to-noise ratio. FIG. 37E shows another
version of a
code MMW waveform where the weight of the second segment is established by its
pulse
width rather than its amplitude or scale factor, as with the preceding MMWs.
From
these examples it is evident that a wide variety of code MMWs are possible.


CA 02525798 1996-05-24
~70-
Some of the key characteristics which distinguish code MMWs from
conventional code tracking windows, e.g., windows formed by early minus late
detectors, include having multiple segments, having segments of different
polarity, and
having seganeras of dil~nt weight (amplitude. scale factor, and/or width). The
purpose
of these diffetrnres, as illustrated by FIGS. 23F, 24C, ZSF, 25E and 27E, is
to achieve
a code error function with a value of zero just before, and much closer to,
the central
tracking region thaw is possible with a narrow cornelator window.
The multipath phase correction portion of this invention also is not
restricted
to a particular recxiver configuration. The essence of the phase correction
invention is
IO to sample the input signal vector immediately after each PItN code
transition and to
vector sum these samples with an equivalent number of identically weighted
samples
taken where there is no code transition. The vector sum of these samples is
shown to
produce a vector which represents the phase of the direct signal, unaffected
by multipath
signals whose code transitions occur after the transition samples are taken.
Because
received signals are filtered, the measured signal requires a finite time to
complete a
code transition. Therefore, the samples taken after a direct signal code
transition must
be delayed until it wdl not be affected by the filt~et~ed transition response
time. However,
the sample should be concluded quickly to avoid as many multipath signal
transitions as
possible. As a result, design constraints force the sample after the direct
code transition
~ to be as narrow as practically possible. The samples wbere there is no
transition are not
as highly. constrained. Location is not as critical, and width can be greater,
as long as
the sampled signal result is scaled to match the after-transition samples.
However, to
minimize the effect of those multipath signals with nearly a one chip delay,
best practice
is to tmploy samples of ,equal width placed at the same relative location just
after each
code clock.
It. will be appreciated from the foregoing that various modifications to the
embodiments disclosed may occur to those skilled in the art without departing
from the
true spirit and scope of the invention, . which should not be limited except
as defined by
the appended claims.

Representative Drawing
A single figure which represents the drawing illustrating the invention.
Administrative Status

For a clearer understanding of the status of the application/patent presented on this page, the site Disclaimer , as well as the definitions for Patent , Administrative Status , Maintenance Fee  and Payment History  should be consulted.

Administrative Status

Title Date
Forecasted Issue Date 2008-08-12
(22) Filed 1996-05-24
(41) Open to Public Inspection 1996-11-28
Examination Requested 2006-05-09
(45) Issued 2008-08-12
Expired 2016-05-24

Abandonment History

There is no abandonment history.

Payment History

Fee Type Anniversary Year Due Date Amount Paid Paid Date
Maintenance Fee - Application - New Act 2 1998-05-25 $100.00 2005-11-25
Maintenance Fee - Application - New Act 3 1999-05-25 $100.00 2005-11-25
Maintenance Fee - Application - New Act 4 2000-05-24 $100.00 2005-11-25
Maintenance Fee - Application - New Act 5 2001-05-24 $200.00 2005-11-25
Maintenance Fee - Application - New Act 6 2002-05-24 $200.00 2005-11-25
Maintenance Fee - Application - New Act 7 2003-05-26 $200.00 2005-11-25
Maintenance Fee - Application - New Act 8 2004-05-25 $200.00 2005-11-25
Maintenance Fee - Application - New Act 9 2005-05-24 $200.00 2005-11-25
Registration of a document - section 124 $100.00 2005-11-28
Registration of a document - section 124 $100.00 2005-11-28
Application Fee $400.00 2005-11-28
Maintenance Fee - Application - New Act 10 2006-05-24 $250.00 2006-04-27
Request for Examination $800.00 2006-05-09
Maintenance Fee - Application - New Act 11 2007-05-24 $250.00 2007-05-11
Maintenance Fee - Application - New Act 12 2008-05-26 $250.00 2008-04-22
Final Fee $360.00 2008-05-22
Maintenance Fee - Patent - New Act 13 2009-05-25 $250.00 2009-05-08
Maintenance Fee - Patent - New Act 14 2010-05-25 $250.00 2010-05-14
Maintenance Fee - Patent - New Act 15 2011-05-24 $450.00 2011-05-12
Maintenance Fee - Patent - New Act 16 2012-05-24 $450.00 2012-05-11
Maintenance Fee - Patent - New Act 17 2013-05-24 $450.00 2013-05-13
Maintenance Fee - Patent - New Act 18 2014-05-26 $450.00 2014-05-13
Maintenance Fee - Patent - New Act 19 2015-05-25 $450.00 2015-05-11
Owners on Record

Note: Records showing the ownership history in alphabetical order.

Current Owners on Record
LEICA GEOSYSTEMS INC.
Past Owners on Record
CAHN, CHARLES ROBERT
HATCH, RONALD RAY
KEEGAN, RICHARD GERALD
KNIGHT, JERRY EUGENE
LEICA INC.
STANSELL, THOMAS ATLEE JR.
Past Owners that do not appear in the "Owners on Record" listing will appear in other documentation within the application.
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Document
Description 
Date
(yyyy-mm-dd) 
Number of pages   Size of Image (KB) 
Description 1996-05-24 70 3,612
Abstract 1996-05-24 1 50
Claims 1996-05-24 11 578
Drawings 1996-05-24 33 692
Representative Drawing 2006-01-12 1 14
Cover Page 2006-01-13 2 70
Claims 2007-11-02 7 366
Cover Page 2008-07-31 2 70
Cover Page 2008-10-07 3 102
Assignment 1996-05-24 7 250
Correspondence 2005-12-16 1 39
Correspondence 2008-05-22 1 35
Correspondence 2006-01-27 1 16
Prosecution-Amendment 2006-05-09 1 29
Prosecution-Amendment 2007-05-02 2 54
Correspondence 2007-04-18 4 93
Prosecution-Amendment 2007-11-02 9 435
Correspondence 2008-01-08 1 14
Correspondence 2007-12-18 11 279
Correspondence 2008-09-12 1 35
Prosecution-Amendment 2008-10-07 2 47