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Fastest methods to solve nonlinear systems MANY times

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CJ
CJ el 31 de Jul. de 2017
Comentada: CJ el 31 de Jul. de 2017
I have an unconstrained nonlinear system of 1000 equations & 1000 variables. There are also parameters in the system:
F(x,params)=0
I want to numerically solve this system for different values of the parameters (parameter sweep in a sense). My current approach is:
set=[grid of trial parameter values]
big_x=size(length(set),1000)
for i=1:length(set)
x=fsolve(@(x)Function(x,set(:,i)),x0,options)
big_x(i,:)=x;
end
This approach is too slow. I provide the Jacobian of the system to improve speed but each iteration takes 0.3 seconds and I have 100 million iterations. I've tried other solvers (fminunc, lsqnonlin, manual Newton's method) with little difference. I also tried using previous solutions as new starting values with no performance boost.
Options I've tried:
  • PARFOR: If I could get 1000x parallel then it could be feasible but I cannot seem to get more than 50 parallel processes going on the HPCC I have access to
  • Compiling the code: I don't seem to get a major performance boost when I compile the code, but I will try more.
  • Removing the loop with CELLFUN: I looked into avoiding any loops but people on this forum say that cellfun typically does NOT yield a speed increase and I have been unable to get cellfun to work when I manually code a Newton's method solver.
Question Is there any major approach paradigm I'm missing? If not, then I will abandon the current parameter sweep approach to my underlying estimation problem and seek alternatives.

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John D'Errico
John D'Errico el 31 de Jul. de 2017
Big problems take big time.
1. Compiling will almost NEVER yield a speed increase. If it does, any speed boost will not be that much.
2. cellfun is an implicit loop. But it is still a loop!!!!! Simple loop overhead is not that significant in any case.
3. Parallel processing can give you a boost, limited by the number of processors you can use. If 50X is not sufficient, then you are trying to solve too large of a problem.
I have no idea why you need to solve this system 100 million times, but surely this is the real issue. Finding a viable alternative will surely give you far more of a speed boost than any of the alternatives.
Or, just sit down and read the complete works of Shakespeare a dozen times while you are waiting for this to finish. At least when it is done, you will know them by heart. Can't hurt.
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CJ
CJ el 31 de Jul. de 2017
So the 100 million comes from wanting to do a grid space of 10 parameters with 50 points each and then randomly choosing a subset of those. Perhaps I should phrase this question more as a way to do a parameter sweep/grid search that doesn't require a fine mesh for each parameter.

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