solving ODE by ode45 with singularity
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Good morning,
Enclosed are the codes.
best regards
4 commentaires
David Goodmanson
le 9 Nov 2018
Hi Babacar,
when you say the negative part of the function do you mean the negative part preserving the sign, or do you mean the absolute value of the negative part, so that you get a positive quantity?
Torsten
le 9 Nov 2018
Commented from Babacar:
Hi David, It is: f^+(x)=x, if x>=0, i.e. f^+(x)=max(x,0) and f^-(x)=max(-x,0)
thanks in advance.
Jan
le 9 Nov 2018
ODE45 is a numerical integration. Then do not define the variables as symbolic by sym. What does this mean: "I haven't found the expected solution"? What do you find and what do you expect.
Torsten
le 9 Nov 2018
Commented from Babacar:
Hi Jan, I get some NAN. You can run the code to see what happened. I want to found the solution T of the ODE (T depends on t and x: T(t,x)), t \in [O,1] and x \in [-R,R]. best regards
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