Can ode45 solve a ODE with space dependent parameters?
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Hello,
I read ode45() can solve functions with time dependent parameters like this below by interpolating f and g during each time step.
y'(t)+f(t)y(t)=g(t)
However, can ode45 (or other solver) solve a system of odes like this below in which [A], [B] and [C] are matrices with some terms dependent of y and y=y(t)?
{dy/dt} = [A]{y^4}+[B]{y}+{C}
Ai=Ai(y)
Bi=Bi(y)
Ci=Ci(y)
Well, since this equation appears in a problem I solve using Simscape (Backward Euler method as default), I suppose I could find a solver to solve it inside Matlab codes without using Simscape.
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James Tursa
2019 年 1 月 29 日
Yes. In general, if the derivative is a function of current state and time (even if there are vectors or matrices involved), then you can use ode45 to get a numerical solution. The caveat is that the function needs to be "nice" enough for ode45 to handle. Otherwise you may need stiff solvers, etc.
5 件のコメント
James Tursa
2021 年 8 月 5 日
@Ying Wu It would be best if you posted a new Question with the details of your particular problem & derivative functions.
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