High amplitude in the solution of seconde order differential equation using ode 45

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Abhik Saha 2022년 9월 8일

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https://kr.mathworks.com/matlabcentral/answers/1800225-high-amplitude-in-the-solution-of-seconde-order-differential-equation-using-ode-45

편집: Abhik Saha 2022년 9월 8일

I have a code (see below) that solve the second order differential equation. As a output it gives the position and velocity as a function of time. Now I want to plot this position vs time for several values of omega ranging from 0.1 to 1.5. But there are some cases when omega=0.48,0.5,0.85 it gives the solution of position of amplitude 10^91 (diverge solution). I guess this is due to some error but I can not find the error. For other cases of omega it gives consistent result (oscillating behaviour). How to overcome this errors for above omegas. Please help regarding this. I am new to MATLAB.

%% MAIN PROGRAM %%

t=linspace(0,10000,5000);

y0=[1 0];

omega=0.85;

[tsol, ysol]=ode45(@(t,y0) firstodefun4(t,y0,omega), t, y0, omega);

position=ysol(:,1);

velocity=ysol(:,2);

%% FUNCTION DEFINITION%%

function dy=firstodefun4(t,y0,omega)

F=1;gamma=0.01;omega0=1;

kappa=0.15;

dy=zeros(2,1);