Why is my operation(with syms variables) too slow?
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Hello! I want to solve this operation:
for l=1236:4084
i= F3(l,1);
aux2=Aux23(l,:);
aux=Aux3(l,:);
xaux=x(i,:);
xaux(aux2)=[];
x1aux=x1(i,1);
x2aux=x2(i,1);
sumxxaux=sumxx(i,1);%chicas y delta
elast33(1,3)=subs(elast(1,3),[Ba,Bu,B1,B2,B3,e],[qqB2(i,4),qqB2(i,23),qqB2(i,aux(1,1)),qqB2(i,aux(1,2)),qqB2(i,aux(1,3)),qqE(i,4)]);
elast33(2,3)=subs(elast(2,3),[Ba,Bu,B1,B2,B3,e],[qqB2(i,4),qqB2(i,23),qqB2(i,aux(1,1)),qqB2(i,aux(1,2)),qqB2(i,aux(1,3)),qqE(i,4)]);
elast33(3,3)=subs(elast(3,3),[Ba,Bu,B1,B2,B3,e],[qqB2(i,4),qqB2(i,23),qqB2(i,aux(1,1)),qqB2(i,aux(1,2)),qqB2(i,aux(1,3)),qqE(i,4)]);
elast33(4,3)=subs(elast(4,3),[Ba,Bu,B1,B2,B3,e],[qqB2(i,4),qqB2(i,23),qqB2(i,aux(1,1)),qqB2(i,aux(1,2)),qqB2(i,aux(1,3)),qqE(i,4)]);
elast33(5,3)=subs(elast(5,3),[Ba,Bu,B1,B2,B3,e],[qqB2(i,4),qqB2(i,23),qqB2(i,aux(1,1)),qqB2(i,aux(1,2)),qqB2(i,aux(1,3)),qqE(i,4)]);
PQ=[ (qqA(i,4) - qqB2(i,4).*(0.13.*x1aux) - qqE(i,4).*(0.16.*x2aux+sumxxaux))./(0.13.*x1aux)
(qqA(i,4) - qqB2(i,23).*(0.16.*x2aux) - qqE(i,4).*(0.13.*x1aux+sumxxaux))./(0.16.*x2aux)
(qqA(i,4) - qqB2(i,aux(1,1)).*xaux(1,1) - qqE(i,4).*(0.13.*x1aux+0.16.*x2aux+sumxxaux-xaux(1,1)))./(xaux(1,1))
(qqA(i,4) - qqB2(i,aux(1,2)).*xaux(1,2) - qqE(i,4).*(0.13.*x1aux+0.16.*x2aux+sumxxaux-xaux(1,2)))./(xaux(1,2))
(qqA(i,4) - qqB2(i,aux(1,3)).*xaux(1,3) - qqE(i,4).*(0.13.*x1aux+0.16.*x2aux+sumxxaux-xaux(1,3)))./(xaux(1,3))];
%PQ=PQ';
Elast1(i,1)=double(subs(elast33(1,3).*PQ(1,1)));
Elast1(i,2)=double(subs(elast33(2,3).*PQ(2,1)));
Elast1(i,3)=double(subs(elast33(3,3).*PQ(3,1)));
Elast1(i,4)=double(subs(elast33(4,3).*PQ(4,1)));
Elast1(i,5)=double(subs(elast33(5,3).*PQ(5,1)));
Elast1(i,:)=[elastd3(1,3) elastd3(2,3) elastd3(3,3) elastd3(4,3) elastd3(5,3) 0 0 0 0 0 0]; end
elast is a matrix of functions where each contains the syms variables (Ba, Bu, B1, B2..e). In this way, for each iteration of "i", a new elast33 matrix is formed depending on this i and on the values taken by the syms variables qqB2, qqA, qqE.
Then I form the PQ matrix that also depends on these last variables and others that are already defined in the problem(xaux,aux,aux2..). Then I finally multiply both matrices.
I can not find where the problem of slowness is! It takes about 1 to 1.5 minutes in each iteration and I need to do it for 15,000 iterations. elast are long functions, can there be the problem? For example, in this case elast is:
elast(:,3)=
-(3*e^4 - 2*B2*e^3 - 2*B3*e^3 - 2*Bu*e^3 - 2*B1*e^3 + B1*B2*e^2 + B1*B3*e^2 + B2*B3*e^2 + B1*Bu*e^2 + B2*Bu*e^2 + B3*Bu*e^2 - B1*B2*B3*Bu)/(3*B1*e^4 + 3*B2*e^4 + 3*B3*e^4 + 3*Ba*e^4 + 3*Bu*e^4 - 4*e^5 - 2*B1*B2*e^3 - 2*B1*B3*e^3 - 2*B2*B3*e^3 - 2*B1*Ba*e^3 - 2*B2*Ba*e^3 - 2*B3*Ba*e^3 - 2*B1*Bu*e^3 - 2*B2*Bu*e^3 - 2*B3*Bu*e^3 - 2*Ba*Bu*e^3 + B1*B2*B3*e^2 + B1*B2*Ba*e^2 + B1*B3*Ba*e^2 + B2*B3*Ba*e^2 + B1*B2*Bu*e^2 + B1*B3*Bu*e^2 + B2*B3*Bu*e^2 + B1*Ba*Bu*e^2 + B2*Ba*Bu*e^2 + B3*Ba*Bu*e^2 - B1*B2*B3*Ba*Bu);
-(3*e^4 - 2*B2*e^3 - 2*B3*e^3 - 2*Ba*e^3 - 2*B1*e^3 + B1*B2*e^2 + B1*B3*e^2 + B2*B3*e^2 + B1*Ba*e^2 + B2*Ba*e^2 + B3*Ba*e^2 - B1*B2*B3*Ba)/(3*B1*e^4 + 3*B2*e^4 + 3*B3*e^4 + 3*Ba*e^4 + 3*Bu*e^4 - 4*e^5 - 2*B1*B2*e^3 - 2*B1*B3*e^3 - 2*B2*B3*e^3 - 2*B1*Ba*e^3 - 2*B2*Ba*e^3 - 2*B3*Ba*e^3 - 2*B1*Bu*e^3 - 2*B2*Bu*e^3 - 2*B3*Bu*e^3 - 2*Ba*Bu*e^3 + B1*B2*B3*e^2 + B1*B2*Ba*e^2 + B1*B3*Ba*e^2 + B2*B3*Ba*e^2 + B1*B2*Bu*e^2 + B1*B3*Bu*e^2 + B2*B3*Bu*e^2 + B1*Ba*Bu*e^2 + B2*Ba*Bu*e^2 + B3*Ba*Bu*e^2 - B1*B2*B3*Ba*Bu);
-(3*e^4 - 2*B3*e^3 - 2*Ba*e^3 - 2*Bu*e^3 - 2*B2*e^3 + B2*B3*e^2 + B2*Ba*e^2 + B3*Ba*e^2 + B2*Bu*e^2 + B3*Bu*e^2 + Ba*Bu*e^2 - B2*B3*Ba*Bu)/(3*B1*e^4 + 3*B2*e^4 + 3*B3*e^4 + 3*Ba*e^4 + 3*Bu*e^4 - 4*e^5 - 2*B1*B2*e^3 - 2*B1*B3*e^3 - 2*B2*B3*e^3 - 2*B1*Ba*e^3 - 2*B2*Ba*e^3 - 2*B3*Ba*e^3 - 2*B1*Bu*e^3 - 2*B2*Bu*e^3 - 2*B3*Bu*e^3 - 2*Ba*Bu*e^3 + B1*B2*B3*e^2 + B1*B2*Ba*e^2 + B1*B3*Ba*e^2 + B2*B3*Ba*e^2 + B1*B2*Bu*e^2 + B1*B3*Bu*e^2 + B2*B3*Bu*e^2 + B1*Ba*Bu*e^2 + B2*Ba*Bu*e^2 + B3*Ba*Bu*e^2 - B1*B2*B3*Ba*Bu);
-(3*e^4 - 2*B3*e^3 - 2*Ba*e^3 - 2*Bu*e^3 - 2*B1*e^3 + B1*B3*e^2 + B1*Ba*e^2 + B3*Ba*e^2 + B1*Bu*e^2 + B3*Bu*e^2 + Ba*Bu*e^2 - B1*B3*Ba*Bu)/(3*B1*e^4 + 3*B2*e^4 + 3*B3*e^4 + 3*Ba*e^4 + 3*Bu*e^4 - 4*e^5 - 2*B1*B2*e^3 - 2*B1*B3*e^3 - 2*B2*B3*e^3 - 2*B1*Ba*e^3 - 2*B2*Ba*e^3 - 2*B3*Ba*e^3 - 2*B1*Bu*e^3 - 2*B2*Bu*e^3 - 2*B3*Bu*e^3 - 2*Ba*Bu*e^3 + B1*B2*B3*e^2 + B1*B2*Ba*e^2 + B1*B3*Ba*e^2 + B2*B3*Ba*e^2 + B1*B2*Bu*e^2 + B1*B3*Bu*e^2 + B2*B3*Bu*e^2 + B1*Ba*Bu*e^2 + B2*Ba*Bu*e^2 + B3*Ba*Bu*e^2 - B1*B2*B3*Ba*Bu);
-(3*e^4 - 2*B2*e^3 - 2*Ba*e^3 - 2*Bu*e^3 - 2*B1*e^3 + B1*B2*e^2 + B1*Ba*e^2 + B2*Ba*e^2 + B1*Bu*e^2 + B2*Bu*e^2 + Ba*Bu*e^2 - B1*B2*Ba*Bu)/(3*B1*e^4 + 3*B2*e^4 + 3*B3*e^4 + 3*Ba*e^4 + 3*Bu*e^4 - 4*e^5 - 2*B1*B2*e^3 - 2*B1*B3*e^3 - 2*B2*B3*e^3 - 2*B1*Ba*e^3 - 2*B2*Ba*e^3 - 2*B3*Ba*e^3 - 2*B1*Bu*e^3 - 2*B2*Bu*e^3 - 2*B3*Bu*e^3 - 2*Ba*Bu*e^3 + B1*B2*B3*e^2 + B1*B2*Ba*e^2 + B1*B3*Ba*e^2 + B2*B3*Ba*e^2 + B1*B2*Bu*e^2 + B1*B3*Bu*e^2 + B2*B3*Bu*e^2 + B1*Ba*Bu*e^2 + B2*Ba*Bu*e^2 + B3*Ba*Bu*e^2 - B1*B2*B3*Ba*Bu)
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Please Help! I need to solve this more faster because I have to submit my investigation.
Thanks!
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