This template shows how to simulate a simple vehicle in Simulink using a s-function. The graphics are also plotted.

## Contents

This model uses the s-function SimpleVehicleSFunction.m in Simulink. The package and this s-function must be in Matlab path.

It can be seen that the longitudinal forces of the tire are zero for the entire simulation. The steering angle recieve a step input.

sim('SimpleVehicleSimulink');

Warning: Model 'SimpleVehicleSimulink' is using a default value of 0.2 for
maximum step size. You can disable this diagnostic by setting 'Automatic solver
parameter selection' diagnostic to 'none' in the Diagnostics page of the
configuration parameters dialog


Each vehicle state variable goes to a scope. And the output of the model is saved in workspace.

## Generating Graphics

To generate the graphics the same model used in SimpleVehicleSFunction.m must be defined.

% Choosing tire model
TireModel = VehicleDynamicsLateral.TirePacejka();
% Defining tire parameters
TireModel.a0 = 1;
TireModel.a1 = 0;
TireModel.a2 = 800;
TireModel.a3 = 3000;
TireModel.a4 = 50;
TireModel.a5 = 0;
TireModel.a6 = 0;
TireModel.a7 = -1;
TireModel.a8 = 0;
TireModel.a9 = 0;
TireModel.a10 = 0;
TireModel.a11 = 0;
TireModel.a12 = 0;
TireModel.a13 = 0;

% Choosing vehicle model
VehicleModel = VehicleDynamicsLateral.VehicleSimpleNonlinear();
% Defining vehicle parameters
VehicleModel.mF0 = 700;
VehicleModel.mR0 = 600;
VehicleModel.IT = 10000;
VehicleModel.lT = 3.5;
VehicleModel.nF = 2;
VehicleModel.nR = 2;
VehicleModel.wT = 2;
VehicleModel.muy = .8;
VehicleModel.tire = TireModel;

simulator = VehicleDynamicsLateral.Simulator(VehicleModel, tout);

% Retrieving states from Simulink model
simulator.XT = simout.Data(:,1);
simulator.YT = simout.Data(:,2);
simulator.PSI = simout.Data(:,3);
simulator.VEL = simout.Data(:,4);
simulator.ALPHAT = simout.Data(:,5);
simulator.dPSI = simout.Data(:,6);

g = VehicleDynamicsLateral.Graphics(simulator);
g.TractorColor = 'r';

g.Frame();
g.Animation();


As expected the vehicle starts traveling in a straight line and starts a turn at $$t = 1 \, s$$ because of the step function.