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fws_kinematic.py
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fws_kinematic.py
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"""
Example fws_beacons_observer.py
Author: Joshua A. Marshall <[email protected]>
GitHub: https://github.com/botprof/agv-examples
"""
# %%
# SIMULATION SETUP
import numpy as np
import matplotlib.pyplot as plt
from mobotpy.integration import rk_four
from mobotpy.models import FourWheelSteered
# Set the simulation time [s] and the sample period [s]
SIM_TIME = 30.0
T = 0.1
# Create an array of time values [s]
t = np.arange(0.0, SIM_TIME, T)
N = np.size(t)
# %%
# VEHICLE SETUP
# Set the wheelbase and track of the vehicle [m]
ELL_W = 2.50
ELL_T = 1.75
# Let's now use the class Ackermann for plotting
vehicle = FourWheelSteered(ELL_W, ELL_T)
# %%
# RUN SIMULATION
# Initialize arrays that will be populated with our inputs and states
x = np.zeros((4, N))
u = np.zeros((2, N))
# Set the initial pose [m, m, rad, rad], velocities [m/s, rad/s]
x[0, 0] = 0.0
x[1, 0] = 0.0
x[2, 0] = np.pi / 2.0
x[3, 0] = 0.0
u[0, 0] = 5.0
u[1, 0] = 0.0
# Run the simulation
for k in range(1, N):
x[:, k] = rk_four(vehicle.f, x[:, k - 1], u[:, k - 1], T)
u[0, k] = 5.0
u[1, k] = -0.5 * np.sin(1.0 * t[k])
# %%
# MAKE SOME PLOTS
# Change some plot settings (optional)
plt.rc("text", usetex=True)
plt.rc("text.latex", preamble=r"\usepackage{cmbright,amsmath,bm}")
plt.rc("savefig", format="pdf")
plt.rc("savefig", bbox="tight")
# Plot the states as a function of time
fig1 = plt.figure(1)
fig1.set_figheight(6.4)
ax1a = plt.subplot(311)
plt.plot(t, x[0, :])
plt.grid(color="0.95")
plt.ylabel(r"$x$ [m]")
plt.setp(ax1a, xticklabels=[])
ax1b = plt.subplot(312)
plt.plot(t, x[1, :])
plt.grid(color="0.95")
plt.ylabel(r"$y$ [m]")
plt.setp(ax1b, xticklabels=[])
ax1c = plt.subplot(313)
plt.plot(t, x[2, :] * 180.0 / np.pi)
plt.grid(color="0.95")
plt.ylabel(r"$\theta$ [deg]")
plt.xlabel(r"$t$ [s]")
plt.legend()
# Save the plot
# plt.savefig("../agv-book/figs/ch3/ackermann_kinematic_fig1.pdf")
# Plot the position of the vehicle in the plane
fig2 = plt.figure(2)
plt.plot(x[0, :], x[1, :])
plt.axis("equal")
X_BL, Y_BL, X_BR, Y_BR, X_FL, Y_FL, X_FR, Y_FR, X_BD, Y_BD = vehicle.draw(x[:, 0])
plt.fill(X_BL, Y_BL, "k")
plt.fill(X_BR, Y_BR, "k")
plt.fill(X_FR, Y_FR, "k")
plt.fill(X_FL, Y_FL, "k")
plt.fill(X_BD, Y_BD, "C2", alpha=0.5, label="Start")
X_BL, Y_BL, X_BR, Y_BR, X_FL, Y_FL, X_FR, Y_FR, X_BD, Y_BD = vehicle.draw(x[:, N - 1])
plt.fill(X_BL, Y_BL, "k")
plt.fill(X_BR, Y_BR, "k")
plt.fill(X_FR, Y_FR, "k")
plt.fill(X_FL, Y_FL, "k")
plt.fill(X_BD, Y_BD, "C3", alpha=0.5, label="End")
plt.xlabel(r"$x$ [m]")
plt.ylabel(r"$y$ [m]")
plt.legend()
# Save the plot
# plt.savefig("../agv-book/figs/ch3/ackermann_kinematic_fig2.pdf")
# Show all the plots to the screen
plt.show()
# %%
# MAKE AN ANIMATION
# Create the animation
ani = vehicle.animate(
x,
T,
)
# Create and save the animation
# ani = vehicle.animate(
# x,
# T,
# True,
# "../agv-book/gifs/ch3/ackermann_kinematic.gif",
# )
# Show the movie to the screen
plt.show()
# # Show animation in HTML output if you are using IPython or Jupyter notebooks
# plt.rc('animation', html='jshtml')
# display(ani)
# plt.close()