linear 1st order ODEs sytem with time-dependent coefficients solver
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I need to solve many times the following ODEs system:
F'(t) = A(t)*F(t) + B(t)*U(t)
F(0) = F0
where matrices A(t), B(t) and vector control function U(t) contains time-dependent coefficients or functions, which are represented in my case by discrete time-series (fixed sampling period ~ 1sec, 1e3-1e5 samples). Typical dimension of problem is ~ 2 - 6.
Proper interpolation (smooth and fast enough) of discrete time-series is the crucial requirement.
This ODEs systems will be solved many times (~ 1e2-1e4 times) for different A(t),B(t), U(t) and F0 , so solver should be fast enough + parallelizеd (multithreaded).
The MATLAB offers a set of generic ODE solvers, but I am looking for a specific problem solver (linear 1st order ODEs system with time-dependent coefficients), which will be fast and reliable. So far I found only one solver - LDE.
My questions are:
- Is there any other special solver (implemented in MATLAB) suitable to solve my specific problem effectively and reliably?
- Is there any reason to expect, that some special solver would be better than standard MATLAB ODE solvers in my specific problem?
- Is there any suitable or recomended strategy how to solve this specific problem?
12 Commenti
Bjorn Gustavsson
il 3 Ago 2023
I recall reading the answers to this question and gaining some insight to this type of problem. Now, what remains is nothing more than the cold ashes. That's a pity.
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Michal
il 25 Lug 2023
Modificato: Michal
il 25 Lug 2023
5 Commenti
Paul
il 25 Lug 2023
Yes, I've read your question, comments, and answer. Which interpolation method did you use in the anonymous function handles input to LDE? Just asking out of curiosity at this point because it seems you have a satisfactory answer to your question.
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