How to solve nonlinear equation?

20 Dec 2022
2 Answers
Answer Accepted
Updated 23 Dec 2022
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 Accepted Answer

Sam Chak
Sam Chak on 21 Dec 2022
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Hi @GUANGHE HUO
The nonlinear matrix ODE with time-varying stiffness matrix K can be transformed into a nonlinear state-space model. See example below.
tspan = [0 40];
x0 = [1 0.5 0 0];
[t, x] = ode45(@odefcn, tspan, x0);
plot(t, x), grid on, xlabel('t')
function xdot = odefcn(t, x)
xdot = zeros(4, 1);
M = diag([3 5]);
C = 2*eye(2);
K = [1+0.5*sin(2*pi/40*t) 0; 0 1+0.5*sin(2*pi/40*t)]; % time-varying K
A = [zeros(2) eye(2); -M\K -M\C];
B = [zeros(2); eye(2)];
F = [0; 0]; % Requires your input
u = M\F;
xdot = A*x + B*u;
end

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GUANGHE HUO
GUANGHE HUO on 21 Dec 2022
thanks for your answer@Sam Chak, I will try
GUANGHE HUO
GUANGHE HUO on 21 Dec 2022
Hi, @Sam Chak, for every time point, I have stored the Force vector and Stiffness Matrix by using cell, like F{i,1} and K{i,1}. I want to use ode45 in a LOOP, as following:
for kk=1:1:Length(T) % T is time point vector
end
but now I do not know how to use the template that you give me? Do you have some advice?
Sam Chak
Sam Chak on 23 Dec 2022
Ran in:
Ran in:
Hi @GUANGHE HUO
I use ordinary numeric array in my simulations. Perhaps you can try using the cell2mat() command to convert the selected cell array into the desired numeric array.
https://www.mathworks.com/help/matlab/ref/cell2mat.html
If your Force vector and the Stiffness matrix are time series data (cannot be expressed in any fundamental mathematical form), then you need to use the interp1() function to interpolate and to obtain the value of the time-dependent terms at the specified time.
Here is an example of using a data-driven Force to stabilize the Double Integrator system:
% Force data set recorded over some intervals of time
ft = linspace(0, 20, 2001);
f = 2*exp(-ft).*ft - exp(-ft).*(1 + ft); % made-up to generate the data
tspan = [0 20];
y0 = [1 0];
opts = odeset('RelTol', 1e-4, 'AbsTol', 1e-8);
[t, y] = ode45(@(t, y) doubleInt(t, y, ft, f), tspan, y0, opts);
plot(t, y), grid on, xlabel('t'), ylabel('Y(t)')
legend('y_{1}(t)', 'y_{2}(t)')
% Double Integrator system
function dydt = doubleInt(t, y, ft, f)
dydt = zeros(2, 1);
f = interp1(ft, f, t); % Interpolate the data set (ft, f) at time t
dydt(1) = y(2);
dydt(2) = f;
end
GUANGHE HUO
GUANGHE HUO on 23 Dec 2022
Thanks for your help.@Sam Chak, You give me a lot of help, because i am new for MATLAB

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More Answers (1)

Torsten
Torsten on 20 Dec 2022

0 votes

Write as
xdot = y
ydot = inv(M)*(F-c*y-K*x)
and use ode45 to solve.

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GUANGHE HUO
GUANGHE HUO
on 20 Dec 2022

Commented:

GUANGHE HUO
GUANGHE HUO
on 23 Dec 2022

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