I want to solve a nonlinear differential equation and I have tried many methods, such as ode45,ode15s, but failed. Could you please give me a help. The equation is
x''+0.01x'+x+2(x'-0.55x)^3=sin(0.1t)% (I will expand it in my program).
I have wrote the ode method in Matlab, please have a look.
%system governing function function xdot=ForcedOscillator1(t,x,dummy,zeta,a,b,c,d,Omega,Xo) xdot=[x(2);-zeta*x(2)-x(1)-a*x(2)^3-b*x(2)^2*x(1)-c*x(2)*x(1)^2-d*x(1)^3+Xo*sin(Omega*t)]; %ode program clear all clc zeta=0.01; a=2; b=-3.3; c=1.815; d=-0.3328; Omega=0.1; Xo=1; tspan=[0 100] options=odeset('RelTol',1e-8,'AbsTol',[1e-8 1e-8]); for m=1:1 [t,x]=ode15s('ForcedOscillator1',tspan,[0 0]',options,zeta,a(m),b(m),c(m),d (m),Omega,Xo); plot(t,zeta.*x(:,2)+x(:,1)+a.*x(:,2).^3+b.*x(:,2).^2.*x(:,1)+c.*x(:,2).*x(:,1).^2+d.*x(:,1).^3); grid on xlabel('t(s)'); ylabel('F_t(N)'); title('Response of a nonlinear system'); hold on end
As you can see, when I run this file, the output will be extraordinarily large, it will reach about 10^49. I think it must be something wrong in my program or the system is unstable. could you please help solve this question in the numerical methods. Or prove this equation is unstable.