GPS receiver simulation model

The `gpsSensor`

System
object™ models data output from a Global Positioning System (GPS) receiver.

To model a GPS receiver:

Create the

`gpsSensor`

object and set its properties.Call the object with arguments, as if it were a function.

To learn more about how System objects work, see What Are System Objects? (MATLAB).

returns a
`GPS`

= gpsSensor`gpsSensor`

System
object that computes a Global Positioning System receiver reading based on a local
position and velocity input signal. The default reference position in geodetic coordinates is

latitude: 0

^{o}Nlongitude: 0

^{o}Ealtitude: 0 m

`GPS = gpsSensor(`

returns a `'ReferenceFrame'`

,`RF`

)`gpsSensor`

System
object that computes a global positioning system receiver reading relative to the
reference frame `RF`

. Specify `RF`

as
`'NED'`

(North-East-Down) or `'ENU'`

(East-North-Up).
The default value is `'NED'`

.

`GPS = gpsSensor(___,`

sets each property `Name,Value`

)`Name`

to the specified `Value`

.
Unspecified properties have default values.

Unless otherwise indicated, properties are *nontunable*, which means you cannot change their
values after calling the object. Objects lock when you call them, and the
`release`

function unlocks them.

If a property is *tunable*, you can change its value at
any time.

For more information on changing property values, see System Design in MATLAB Using System Objects (MATLAB).

`UpdateRate`

— Update rate of receiver (Hz)`1`

(default) | positive real scalarUpdate rate of the receiver in Hz, specified as a positive real scalar.

**Data Types: **`single`

| `double`

`ReferenceLocation`

— Origin of local navigation reference frame`[0 0 0]`

(default) | [degrees degrees meters]Reference location, specified as a 3-element row vector in geodetic coordinates (latitude, longitude, and altitude). Altitude is the height above the reference ellipsoid model, WGS84. The reference location is in [degrees degrees meters]. The degree format is decimal degrees (DD).

**Data Types: **`single`

| `double`

`HorizontalPositionAccuracy`

— Horizontal position accuracy (m)`1.6`

(default) | nonnegative real scalarHorizontal position accuracy in meters, specified as a nonnegative real scalar. The horizontal position accuracy specifies the standard deviation of the noise in the horizontal position measurement.

**Tunable: **Yes

**Data Types: **`single`

| `double`

`VerticalPositionAccuracy`

— Vertical position accuracy (m)`3`

(default) | nonnegative real scalarVertical position accuracy in meters, specified as a nonnegative real scalar. The vertical position accuracy specifies the standard deviation of the noise in the vertical position measurement.

**Tunable: **Yes

**Data Types: **`single`

| `double`

`VelocityAccuracy`

— Velocity accuracy (m/s)`0.1`

(default) | nonnegative real scalarVelocity accuracy in meters per second, specified as a nonnegative real scalar. The velocity accuracy specifies the standard deviation of the noise in the velocity measurement.

**Tunable: **Yes

**Data Types: **`single`

| `double`

`DecayFactor`

— Global position noise decay factor`0.999`

(default) | scalar in the range [0,1]Global position noise decay factor, specified as a scalar in the range [0,1].

A decay factor of 0 models the global position noise as a white noise process. A decay factor of 1 models the global position noise as a random walk process.

**Tunable: **Yes

**Data Types: **`single`

| `double`

`RandomStream`

— Random number source`'Global stream'`

(default) | `'mt19937ar with seed'`

Random number source, specified as a character vector or string:

`'Global stream'`

–– Random numbers are generated using the current global random number stream.`'mt19937ar with seed'`

–– Random numbers are generated using the mt19937ar algorithm with the seed specified by the`Seed`

property.

**Data Types: **`char`

| `string`

`Seed`

— Initial seed`67`

(default) | nonnegative integer scalarInitial seed of an mt19937ar random number generator algorithm, specified as a nonnegative integer scalar.

To enable this property, set `RandomStream`

to
`'mt19937ar with seed'`

.

**Data Types: **`single`

| `double`

| `int8`

| `int16`

| `int32`

| `int64`

| `uint8`

| `uint16`

| `uint32`

| `uint64`

`[`

computes global navigation satellite system receiver readings from the position and
velocity inputs.`position`

,`velocity`

,`groundspeed`

,`course`

] = GPS(`truePosition`

,`trueVelocity`

)

`truePosition`

— Position of GPS receiver in local navigation coordinate system (m)Position of the GPS receiver in the local navigation coordinate system in meters,
specified as a real finite *N*-by-3 matrix.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

`trueVelocity`

— Velocity of GPS receiver in local navigation coordinate system (m/s)Velocity of GPS receiver in the local navigation coordinate system in meters per
second, specified as a real finite *N*-by-3 matrix.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

`position`

— Position in LLA coordinate systemPosition of the GPS receiver in the geodetic latitude, longitude, and altitude
(LLA) coordinate system, returned as a real finite *N*-by-3 array.
Latitude and longitude are in degrees with North and East being positive. Altitude is
in meters.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

`velocity`

— Velocity in local navigation coordinate system (m/s)Velocity of the GPS receiver in the local navigation coordinate system in meters
per second, returned as a real finite *N*-by-3 array.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

`groundspeed`

— Magnitude of horizontal velocity in local navigation coordinate system (m/s)Magnitude of the horizontal velocity of the GPS receiver in the local navigation
coordinate system in meters per second, returned as a real finite
*N*-by-1 column vector.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

`course`

— Direction of horizontal velocity in local navigation coordinate system (°)Direction of the horizontal velocity of the GPS receiver in the local navigation
coordinate system in degrees, returned as a real finite *N*-by-1
column of values between 0 and 360. North corresponds to 360 degrees and East
corresponds to 90 degrees.

*N* is the number of samples in the current frame.

**Data Types: **`single`

| `double`

To use an object function, specify the
System
object as the first input argument. For
example, to release system resources of a System
object named `obj`

, use
this syntax:

release(obj)

Create a `gpsSensor`

System object™ to model GPS receiver data. Assume a typical one Hz sample rate and a 1000-second simulation time. Define the reference location in terms of latitude, longitude, and altitude (LLA) of Natick, MA (USA). Define the sensor as stationary by specifying the true position and velocity with zeros.

fs = 1; duration = 1000; numSamples = duration*fs; refLoc = [42.2825 -71.343 53.0352]; truePosition = zeros(numSamples,3); trueVelocity = zeros(numSamples,3); gps = gpsSensor('UpdateRate',fs,'ReferenceLocation',refLoc);

Call `gps`

with the specified `truePosition`

and `trueVelocity`

to simulate receiving GPS data for a stationary platform.

position = gps(truePosition,trueVelocity);

Plot the true position and the GPS sensor readings for position.

t = (0:(numSamples-1))/fs; subplot(3, 1, 1) plot(t, position(:,1), ... t, ones(numSamples)*refLoc(1)) title('GPS Sensor Readings') ylabel('Latitude (degrees)') subplot(3, 1, 2) plot(t, position(:,2), ... t, ones(numSamples)*refLoc(2)) ylabel('Longitude (degrees)') subplot(3, 1, 3) plot(t, position(:,3), ... t, ones(numSamples)*refLoc(3)) ylabel('Altitute (m)') xlabel('Time (s)')

The position readings have noise controlled by `HorizontalPositionAccuracy`

, `VerticalPositionAccuracy`

, `VelocityAccuracy`

, and `DecayFactor`

. The `DecayFactor`

property controls the drift in the noise model. By default, `DecayFactor`

is set to `0.999`

, which approaches a random walk process. To observe the effect of the `DecayFactor`

property:

Reset the

`gps`

object.Set

`DecayFactor`

to`0.5`

.Call

`gps`

with variables specifying a stationary position.Plot the results.

The `GPS`

position readings now oscillate around the true position.

reset(gps) gps.DecayFactor = 0.5; position = gps(truePosition,trueVelocity); subplot(3, 1, 1) plot(t, position(:,1), ... t, ones(numSamples)*refLoc(1)) title('GPS Sensor Readings - Decay Factor = 0.5') ylabel('Latitude (degrees)') subplot(3, 1, 2) plot(t, position(:,2), ... t, ones(numSamples)*refLoc(2)) ylabel('Longitude (degrees)') subplot(3, 1, 3) plot(t, position(:,3), ... t, ones(numSamples)*refLoc(3)) ylabel('Altitute (m)') xlabel('Time (s)')

GPS receivers achieve greater course accuracy as groundspeed increases. In this example, you create a GPS receiver simulation object and simulate the data received from a platform that is accelerating from a stationary position.

Create a default `gpsSensor`

System object™ to model data returned by a GPS receiver.

GPS = gpsSensor

GPS = gpsSensor with properties: UpdateRate: 1 Hz ReferenceLocation: [0 0 0] [deg deg m] HorizontalPositionAccuracy: 1.6 m VerticalPositionAccuracy: 3 m VelocityAccuracy: 0.1 m/s RandomStream: 'Global stream' DecayFactor: 0.999

Create matrices to describe the position and velocity of a platform in the NED coordinate system. The platform begins from a stationary position and accelerates to 60 m/s North-East over 60 seconds, then has a vertical acceleration to 2 m/s over 2 seconds, followed by a 2 m/s rate of climb for another 8 seconds. Assume a constant velocity, such that the velocity is the simple derivative of the position.

duration = 70; numSamples = duration*GPS.UpdateRate; course = 45*ones(duration,1); groundspeed = [(1:60)';60*ones(10,1)]; Nvelocity = groundspeed.*sind(course); Evelocity = groundspeed.*cosd(course); Dvelocity = [zeros(60,1);-1;-2*ones(9,1)]; NEDvelocity = [Nvelocity,Evelocity,Dvelocity]; Ndistance = cumsum(Nvelocity); Edistance = cumsum(Evelocity); Ddistance = cumsum(Dvelocity); NEDposition = [Ndistance,Edistance,Ddistance];

Model GPS measurement data by calling the `GPS`

object with your velocity and position matrices.

[~,~,groundspeedMeasurement,courseMeasurement] = GPS(NEDposition,NEDvelocity);

Plot the groundspeed and the difference between the true course and the course returned by the GPS simulator.

As groundspeed increases, the accuracy of the course increases. Note that the velocity increase during the last ten seconds has no effect, because the additional velocity is not in the ground plane.

t = (0:numSamples-1)/GPS.UpdateRate; subplot(2,1,1) plot(t,groundspeed); ylabel('Speed (m/s)') title('Relationship Between Groundspeed and Course Accuracy') subplot(2,1,2) courseAccuracy = courseMeasurement - course; plot(t,courseAccuracy) xlabel('Time (s)'); ylabel('Course Accuracy (degrees)')

Simulate GPS data received during a trajectory from the city of Natick, MA, to Boston, MA.

Define the decimal degree latitude and longitude for the city of Natick, MA USA, and Boston, MA USA. For simplicity, set the altitude for both locations to zero.

NatickLLA = [42.27752809999999, -71.34680909999997, 0]; BostonLLA = [42.3600825, -71.05888010000001, 0];

Define a motion that can take a platform from Natick to Boston in 20 minutes. Set the origin of the local NED coordinate system as Natick. Create a `waypointTrajectory`

object to output the trajectory 10 samples at a time.

fs = 1; duration = 60*20; bearing = 68; % degrees distance = 25.39e3; % meters distanceEast = distance*sind(bearing); distanceNorth = distance*cosd(bearing); NatickNED = [0,0,0]; BostonNED = [distanceNorth,distanceEast,0]; trajectory = waypointTrajectory( ... 'Waypoints', [NatickNED;BostonNED], ... 'TimeOfArrival',[0;duration], ... 'SamplesPerFrame',10, ... 'SampleRate',fs);

Create a `gpsSensor`

object to model receiving GPS data for the platform. Set the `HorizontalPositionalAccuracy`

to `25`

and the `DecayFactor`

to `0.25`

to emphasize the noise. Set the `ReferenceLocation`

to the Natick coordinates in LLA.

GPS = gpsSensor( ... 'HorizontalPositionAccuracy',25, ... 'DecayFactor',0.25, ... 'UpdateRate',fs, ... 'ReferenceLocation',NatickLLA);

Open a figure and plot the position of Natick and Boston in LLA. Ignore altitude for simplicity.

In a loop, call the `gpsSensor`

object with the ground-truth trajectory to simulate the received GPS data. Plot the ground-truth trajectory and the model of received GPS data.

figure(1) plot(NatickLLA(1),NatickLLA(2),'ko', ... BostonLLA(1),BostonLLA(2),'kx') xlabel('Latitude (degrees)') ylabel('Longitude (degrees)') title('GPS Sensor Data for Natick to Boston Trajectory') hold on while ~isDone(trajectory) [truePositionNED,~,trueVelocityNED] = trajectory(); reportedPositionLLA = GPS(truePositionNED,trueVelocityNED); figure(1) plot(reportedPositionLLA(:,1),reportedPositionLLA(:,2),'r.') end

As a best practice, release System objects when complete.

release(GPS) release(trajectory)

Generate C and C++ code using MATLAB® Coder™.

Usage notes and limitations:

See System Objects in MATLAB Code Generation (MATLAB Coder).

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