For testing, we need several more variables, such as Lambda_sr and N_sr
fsove is extremely slow
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Long story short I am working on a problem where I have 35 equations and 35 unknowns where each unknown can be up to power 3 (e.g. f1=x1^3+x1^2*x2+...+x35^3, ... f35=...). I have tried to use both fsolve and lsqnonlin to solve solve this system, but the run time is extremely long! I'm talking only 2 steps within fsolve over the course of an hour. Is this time frame to be expected for a system like this, or am I implementing something poorly? The basiscs of my implementation are as follows:
xhat_0s=sym('x_0s',[numStateVars,1],'real'); %numStateVars=35
xhat_0s_1=[xhat_0s;1];
xhat_0s_1Mat=xhat_0s_1*xhat_0s_1';
%Code to calculate the arrays Lambda_sr (35x35x36x36) and N_sr (35x36) is
%not shown but takes place here, Lambda_sr and N_sr are dense and 4-D and
%2-D doubles respectively
expandxmat=permute(repmat(xhat_0s_1Mat,[1,1,35,35]),[3,4,1,2]);
finalLambda=sum(sum(Lambda_sr.*expandxmat,4),3);
%An equivalent but slower way to calculate finalLambda is:
% finalLambda=zeros(numStateVars,numStateVars);
% for ind1=1:numStateVars+1
% for ind2=1:numStateVars+1
% finalLambda=finalLambda+Lambda_sr(:,:,ind1,ind2)*xhat_0s_1Mat(ind1,ind2);
% end
% end
finalN=N_sr*xhat_0s_1;
funct=finalLambda*xhat_0s-finalN;
bigfunct=matlabFunction(funct,'Vars',{xhat_0s}); %this might be the bottleneck
residualFunct=@(x) bigfunct(x); %or maybe this is the bottleneck
initialGuess=zeros(numStateVars,1);
options=optimoptions('fsolve','Display','iter',...
'FunctionTolerance',1e-12,'StepTolerance',1e-16,...
'OptimalityTolerance',1e-12,'MaxIterations',50,...
'MaxFunctionEvaluations',1000);
[xhat_0_fsolve,fval,exitFlag_fsolve,~]=fsolve(residualFunct,initialGuess,options)
My hunch is that the bottleneck is how I am setting up the equation residualFunct to be used by fsolve, but I really don't know. Maybe this problem isn't feasible but I feel like it should be doable. I was able to run the same code for 15 unknowns and it took a while to run, but was still doable (maybe 30 minutes for fsolve to find a solution). Any help here would be much appreciated as this is the last test case that I am attempting to run for my thesis.
7 commentaires
Walter Roberson
le 30 Mar 2025
It is true that the optimization phase can take a very long time. In theory the optimization time required rises proportional to the square of the size of the expression.
dpb
le 31 Mar 2025
Modifié(e) : dpb
le 31 Mar 2025
Given the need for ODE solver, one algorithm alternative could be <Faster Ordinary Differential Equations Solvers>.
Of course, a smaller profiling run to discover where the actual performance bottle neck(s) is(are) first would be a first step in finding out what piece(s) of the code to concentrate on...reducing a 1% area by 50% won't make a noticeable change overall; finding a hot spot that is 70% of the time spent would be something different, indeed.
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