figure()
ax1 = subplot(2,1,1);
ax2 = subplot(2,1,2);
u_set = [0,0;0.5,0.5;1,1];
tspan = [0 5];
n = size(u_set);
syms theta(t);
initial_cond = theta(0) == 0 ;
options = odeset('Events',@ fallEventsFcn);
for i = 1:n(1)
u_set_i = u_set(i,:);
u1 = u_set_i(1);
u2 = u_set_i(2);
[t,f] = ode45(@(t,theta) pendulum_muscle_equation(t,theta,u1,u2),tspan,initial_cond,options);
subplot(ax1)
plot(t(:),f(:,1)*180/pi,'DisplayName',['u1 =' num2str(u_set_i(1)) '; u2 = ' num2str(u_set_i(2))]);
hold on;
subplot(ax2)
plot(t(:),f(:,2),'DisplayName',['u1 =' num2str(u_set_i(1)) '; u2 = ' num2str(u_set_i(2))]);
hold on;
end
ylabel(ax1,'Theta [°]');
ylabel(ax2,'Thetadot [rad/s]');
xlabel(ax2,'Time [s]');
title(ax1,'Angle');
title(ax2,'Velocity');
legend(ax1);
legend(ax2);
function theta_dot = pendulum_muscle_equation(t, theta, u1,u2)
g = 9.81;
r = 0.3;
m = 1;
a1 = 0.0436;
a2 = 0.09;
alpha = 0.0218;
k_0 = 810.8;
k = 1621.6;
damping_ratio = 0.26;
delta = 2*damping_ratio*sqrt(k*m);
delta_0 = 2*damping_ratio*sqrt(k_0*m);
l1 = sqrt(a1^2+a2^2+2*a1*a2*sin(theta(1)));
l2 = sqrt(a1^2+a2^2-2*a1*a2*sin(theta(1)));
l_0 = sqrt(a1^2 + a2^2);
l1_dot = diff(sqrt(a1^2+a2^2+2*a1*a2*sin(theta(1))),t);
l2_dot = diff(sqrt(a1^2+a2^2-2*a1*a2*sin(theta(1))),t);
h1 = a1*a2*cos(theta(1))/l1;
h2 = a1*a2*cos(theta(1))/l2;
K_tot1 = k_0 + k*u1;
D_tot1 = delta_0 + delta * sqrt(u1);
K_tot2 = k_0 + k*u2;
D_tot2 = delta_0 + delta * sqrt(u2);
if l1 < l_0 - alpha * u1
mu1 = 0;
else
mu1 = K_tot1 * (l_0 - alpha*u1 -l1) - D_tot1 * l1_dot;
end
if l2 < l_0 - alpha * u2
mu2 = 0;
else
mu2 = K_tot2 * (l_0 - alpha*u2 -l2) - D_tot2 * l2_dot;
end
theta_dot = zeros(2,1);
theta_dot(1) = theta(2);
theta_dot(2) = (m*g*r*sin(theta(1)) + mu1*h1 - mu2*h2)/(m*r^2);
end
