$30
24-677-Project Part 1 Solved
1 Introduction
This project will entail using Webots, an open-source robotics simulation software, to learn more about control methods for autonomous vehicles. Webots was chosen because of its ease of use, flexibility, and impressive rendering capability. A brief guide for Windows, Mac OS, and Linux follows. Please see the links on the previous page for a link to documentation and more information.
For Windows:
1. Download and install Webots R2021a.
2. Download and install Python natively from Python’s official webpage. 3.9 is recommended, but any version from 3.7 - 3.9 will work.
3. Open a Command Prompt window (right-click and select “Run as Administrator”). On the command line, install numpy, scipy, and matplotlib with the following command:
python -m pip install <package-name>.
4. If you encounter issues installing matplotlib, please try upgrading pip and setuptools::
python -m pip install --upgrade pip python -m pip install --upgrade setuptools
For Mac:
1. Download and install Webots R2020b.
2. Download and install Python natively from Python’s official webpage. 3.8 is recommended, but 3.7 will also work.
3. In a Terminal window, install numpy, scipy, and matplotlib with the following command:
pip3.x install <package-name> where x is the version number you installed.
4. Check where your Python is installed with:
which python3.x
Copy the path that appears and open Webots. In the Webots menu at the top, open Tools → Preferences, and paste the copied path under “Python command”.
For Linux:
1. Download and install Webots R2021a.
2. In a terminal window, make sure you have numpy, scipy, and matplotlib with the following command: pip install <package-name>.
As you might already know, Buggy is a time-honored CMU tradition (you can learn more about it here and here). Unfortunately, it was not able to be held in-person this year due to the pandemic. To help make up for this, you will be asked to create a controller that helps a vehicle to complete the same course in simulation. However, instead of controlling an actual Buggy, you’ll be controlling a Tesla Model 3. It’s a bit more fun and stylish (we hope)!
We will follow the steps listed below to learn more about the system and synthesize several different kinds of controllers:
1. Examine the provided nonlinear control model
2. Linearize the state space system equations [P1]
3. Develop a PID controller for the system [P1]
4. Check the controllability and stabilizability of the system [P2]
5. Design a full-state feedback controller using pole placement [P2]
6. Design an optimal controller [P3]
7. Implement A* algorithm [P3]
8. Implement an extended Kalman filter (EKF) for simultaneous localization and mapping (SLAM) [P4]
The project has been divided into 4 parts to reflect this:
P1 (a) Linearize the state space model
(b) Design a PID lateral and PID longitudinal controller
P2 (a) Check the controllability and stabilizability of the linearized system
(b) Design a lateral full-state feedback controller
P3 (a) Design an lateral optimal controller
(b) Implement A* path planning algorithm
P4 (a) Implement EKF SLAM to control the vehicle without default sensor input
(b) Race with other Buggy competitors in the class
2 Model
Figure 1: Bicycle model [2]
Figure 2: Tire slip-angle [2]
We will make use of a bicycle model for the vehicle, which is a popular model in the study of vehicle dynamics. Shown in Figure 1, the car is modeled as a two-wheel vehicle with two degrees of freedom, described separately in longitudinal and lateral dynamics. The model parameters are defined in Table 2.
2.1 Lateral dynamics
Ignoring road bank angle and applying Newton's second law of motion along the y-axis:
may = Fyf cosδf + Fyr
where is the inertial acceleration of the vehicle at the center of geometry in the direction of the y axis, Fyf and Fyr are the lateral tire forces of the front and rear wheels, respectively, and δf is the front wheel angle, which will be denoted as δ later. Two terms contribute to ay: the acceleration ¨y, which is due to motion along the y-axis, and the centripetal acceleration. Hence: ay = y¨+ ψ˙x˙
Combining the two equations, the equation for the lateral translational motion of the vehicle is obtained as:
Moment balance about the axis yields the equation for the yaw dynamics as
ψI¨ z = lfFyf − lrFyr
The next step is to model the lateral tire forces Fyf and Fyr. Experimental results show that the lateral tire force of a tire is proportional to the “slip-angle” for small slip-angles when vehicle’s speed is large enough - i.e. when ˙x ≥ 0.5 m/s. The slip angle of a tire is defined as the angle between the orientation of the tire and the orientation of the velocity vector of the vehicle. The slip angle of the front and rear wheel is
αf = δ − θV f
αr = −θV r
where θV p is the angle between the velocity vector and the longitudinal axis of the vehicle, for p ∈ {f,r}. A linear approximation of the tire forces are given by
!
where Cα is called the cornering stiffness of the tires. If ˙x < 0.5 m/s, we just set Fyf and Fyr both to zeros.
2.2 Longitudinal dynamics
Similarly, a force balance along the vehicle longitudinal axis yields:
x¨ = ψ˙y˙ + ax
max = F − Ff Ff = fmg
where F is the total tire force along the x-axis, and Ff is the force due to rolling resistance at the tires, and f is the friction coefficient.
2.3 Global coordinates
In the global frame we have:
X˙ = x˙ cosψ − y˙ sinψ
Y˙ = x˙ sinψ + y˙ cosψ
2.4 System equation
Gathering all of the equations, if ˙x ≥ 0.5 m/s, we have:
Y˙ = x˙ sinψ + y˙ cosψ
otherwise, since the lateral tire forces are zeros, we only consider the longitudinal model.
2.5 Measurements
The observable states are:
x˙
y˙
ψ˙ y =
X
Y ψ
2.6 Physical constraints
The system satisfies the constraints that:
F > 0 and F 6 15736 N
x˙ > 10−5 m/s
Table 1: Model parameters.
Name
Description
Unit
Value
(x,˙ y˙)
Vehicle’s velocity along the direction of vehicle frame
m/s
State
(X,Y )
Vehicle’s coordinates in the world frame
m
State
ψ, ψ˙
Body yaw angle, angular speed
rad, rad/s
State
δ or δf
Front wheel angle
rad
State
F
Total input force
N
Input
mass
lf
Length from front tire to the center of mass
m
1.55
Cα
Iz
25854
Fpq
p ∈ {x,y},q ∈ {f,r}
f
sec
3 Resources
3.1 Simulation
Figure 3: Simulation code flow
Several files are provided to you within the controllers/main folder. The main.py script initializes and instantiates necessary objects, and also contains the controller loop. This loop runs once each simulation timestep. main.py calls your controller.py’s update method on each loop to get new control commands (the desired steering angle, δ, and longitudinal force, F). The longitudinal force is converted to a throttle input, and then both control commands are set by Webots internal functions. The additional script util.py contains functions to help you design and execute the controller. The full codeflow is pictured in Figure 3.
Please design your controller in the your controller.py file provided for the project part you’re working on. Specifically, you should be writing code in the update method. Please do not attempt to change code in other functions or files, as we will only grade the relevant your controller.py for the programming portion. However, you are free to add to the CustomController class’s init method (which is executed once when the CustomController object is instantiated).
3.2 BaseController Background
The CustomController class within each your controller.py file derives from the BaseController class in the base controller.py file. The vehicle itself is equipped with a Webots-generated GPS, gyroscope, and compass that have no noise or error. These sensors are started in the BaseController class, and are used to derive the various states of the vehicle. An explanation on the derivation of each can be found in the table below.
Table 2: State Derivation.
Name
Explanation
(X,Y )
From GPS readings
3.3 Trajectory Data
The trajectory is given in buggyTrace.csv. It contains the coordinates of the trajectory as (x,y). The satellite map of the track is shown in Figure 4.
Figure 4: Buggy track[3]
4 P1: Problems
Exercise 1. Model Linearization. As mentioned in class, model linearization is always the first step for non-linear control. During this assignment, you will approximate the given model with a linear model.
Since the longitudinal term ˙x is non-linear in the lateral dynamics, we can simplify the controller by controlling the lateral and longitudinal states separately. You are required to write the system dynamics in linear forms as ˙s1 = A1s1 +B1u and ˙s2 = A2s2 +B2u in terms of the following given input and states:
Assume that for values of ˙x < 0.5 m/s that the system is identical, i.e. there is no need to linearize two separate systems.
Exercise 2. Controller Synthesis in Simulation. The driver functions that control the car take the desired steering angle δ and a throttle input - ranging from 0 to 1 - which is derived from the desired longitudinal force F.
For this question, you have to design a PID longitudinal controller and a PID lateral controller for the vehicle. A PID is an error-based controller that requires tuning proportional, integral, and derivative gains. As a PID allows us to minimize the error between a set point and process variable without deeper knowledge of the system model, we will not need our result from Exercise 1 (though it will be useful in future project parts).
Design the two controllers in your controller.py. You can make use of Webots’ builtin code editor, or use your own.
Check the performance of your controller by running the Webots simulation. You can press the play button in the top menu to start the simulation in real-time, the fast-forward button to run the simulation as quickly as possible, and the triple fast-forward to run the simulation without rendering (any of these options is acceptable, and the faster options may be better for quick tests). If you complete the track, the scripts will generate a performance plot via matplotlib. This plot contains a visualization of the car’s trajectory, and also shows the variation of states with respect to time.
