Solving a system of ODE with Crank Nicholson

3 vues (au cours des 30 derniers jours)
Arkajyoti Chaterjee
Arkajyoti Chaterjee le 8 Jan 2021
I have a set of ODEs as follows :-
d(A)/dt = f(A,B,V)
d(B)/dt g(A,B,V)
d(C)/dt = h(A,B,C,V)
d(D)/dt = i(A,B,C,V)
V = j(t)
Initial values are known and I need to solve the system using Crank-Nicholson Method. Pseudocode will be welcome.
  4 commentaires
Alan Stevens
Alan Stevens le 8 Jan 2021
Modifié(e) : Alan Stevens le 8 Jan 2021
Read the documentation on ode45 to see how to pass more than 2 input arguments.
Arkajyoti Chaterjee
Arkajyoti Chaterjee le 8 Jan 2021
That's resolved, thanks! ODE45 is giving the correct solutions.

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Bjorn Gustavsson
Bjorn Gustavsson le 8 Jan 2021
Note that you have a set of coupled ODEs not PDEs. The Crank-Nicholson method is developed for solving PDEs where we have both "temporal" and "spatial" derivatives, whereas you only seem to have tetmporal derivatives. This makes C-N a rather unusual choise, but is you see your ODEs as "single-position PDEs" you might simply use the equations in that wikipedia-article and scrap all spatial derivatives and boundary-condition-concerns. It will take a bit of time to write out the derivatives and the system of equations you'll need to solve. But it might be well worth for illustrating the method.
Otherwise just use the standard methods for solving coupled ODEs available in matlab (ode45, etc).
HTH
  4 commentaires
Arkajyoti Chaterjee
Arkajyoti Chaterjee le 9 Jan 2021
ODE45 is solved; thanks. The issue with CN is that I have been asked to use the particular algorithm.
Bjorn Gustavsson
Bjorn Gustavsson le 12 Jan 2021
Well that will give you a set of four non-linear equations - since you'll have to replace A, B, C and D on the right-hand sides with the average values of the values at the current time-step and the next time-step. That is:
should become something like:
From there you might get away with linearising the RHS or you might have to solve that nonlinear system of equations in A, B, C and D at i+1. Perhaps you might get a good enough understanding if you implement a 1-D problem first - that would give you some hands-on experience of where this goes programming-wise.
HTH

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