How to integrate ordinary differential equations with pulse-like time-varying parameters?
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Problem.
I am simulating an ordinary differential equation with time-varying parameters as follows
p = @(t) p0*( (T0 < t) & (t < T1) )
sol = ode15s(@(t,x) myode(t,x,p(t)),[t0 tf],x0)
where p(t) is a pulse of amplitude p0 and duration (T1-T0) (if T0 < T1).
Because of its adaptive time-step, the integrator "misses the pulse" if the time-step becomes larger that the pulse duration.
Naive solution.
A naive solution would be to constrain the MaxStep to (T1-T0)/2 to be sure that the pulse is detected by the integrator. However, this constrains the MaxStep at time where it is not really needed.
More efficient solution?
I am wondering if there is a more efficient way to do ensure that the pulse is detected.
4 Comments
Star Strider
on 1 May 2014
Posting (or attaching — use the ‘paperclip’ icon) the code for myode would do for a start, as well as information on p0, T0, and T1. We really cannot suggest a solution to a problem we cannot experiment with ourselves.
RahulTandon
on 8 Jul 2015
pleas send the formulae for the two equations 1) The mymode function 2) The pulse train Awaiting an early reply!
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