Any comment to speed up the speed of caculation of symbolic loops having Legendre polynomials?

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Mehdi el 23 de Sept. de 2022

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Editada: Mehdi el 29 de Sept. de 2022

syms eta__2 zeta__2
II=12;JJ=11;M=22;
Hvs2 = ((5070602400912917605986812821504*(zeta__2 + 2251799813683713/2251799813685248)^2)/2356225 + (9007199254740992*(eta__2 + 2935286035937695/18014398509481984)^2)/196937227765191 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254732683/9007199254740992)^2)/69039481 + (576460752303423488*(eta__2 + 3261970163074917/4503599627370496)^2)/6904142590940591 - 1)*((324518553658426726783156020576256*(zeta__2 + 140737488355209/140737488355328)^2)/231983361 + (144115188075855872*(eta__2 - 262292457514301/562949953421312)^2)/2637878570603985 - 1)*((144115188075855872*(zeta__2 + 4028041154330599/4503599627370496)^2)/424643881623313 + eta__2^2 - 1)*((20282409603651670423947251286016*(zeta__2 - 4503599627213111/4503599627370496)^2)/24770038225 + (288230376151711744*(eta__2 - 7530397878711147/9007199254740992)^2)/5204731445635785 - 1)*((324518553658426726783156020576256*(zeta__2 + 4503599627365785/4503599627370496)^2)/355058649 + (36893488147419103232*(eta__2 + 4434826747744735/4503599627370496)^2)/8603290501959015 - 1)*((4611686018427387904*(eta__2 + 2213733699584161/2251799813685248)^2)/1317884237102575 + (324518553658426726783156020576256*(zeta__2 - 4503599627284663/4503599627370496)^2)/117876175561 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254735975/9007199254740992)^2)/25170289 + (576460752303423488*(eta__2 - 4066832143866835/4503599627370496)^2)/2374649627355687 - 1);
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Wxy2 = sym('Wxy2',[1 M]);
    Wxy3 = sym('Wxy3',[1 M]);
    Wxy2(1:M) = sym('0');
    Wxy3(1:M) = sym('0');
    for r=1:M
        for i=1:II+1
            for j=1:JJ+1
                Wxy2(r) = W(i, j, 2, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy2(r);
                Wxy3(r) = W(i, j, 3, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy3(r);
            end
        end
    end  
    Qn__2 = [vpaintegral(vpaintegral(Wxy2(r)*heaviside(-Hvs2)*(abs(Wxy2-Wxy3)'),zeta__2,-1,1),eta__2,-1,1)];

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Answer 1

Walter Roberson el 23 de Sept. de 2022

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                Wxy2(r) = W(i, j, 2, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy2(r);
                Wxy3(r) = W(i, j, 3, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy3(r);

You are calculating the exact same legendre on both lines. Calculate the product into a temporary variable and use the temporary variable in both lines.

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Mehdi el 24 de Sept. de 2022

Editada: Mehdi el 24 de Sept. de 2022

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sorry, now corrected.

syms eta__2 zeta__2
II=10;JJ=11;M=3;
Hvs2 = ((5070602400912917605986812821504*(zeta__2 + 2251799813683713/2251799813685248)^2)/2356225 + (9007199254740992*(eta__2 + 2935286035937695/18014398509481984)^2)/196937227765191 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254732683/9007199254740992)^2)/69039481 + (576460752303423488*(eta__2 + 3261970163074917/4503599627370496)^2)/6904142590940591 - 1)*((324518553658426726783156020576256*(zeta__2 + 140737488355209/140737488355328)^2)/231983361 + (144115188075855872*(eta__2 - 262292457514301/562949953421312)^2)/2637878570603985 - 1)*((144115188075855872*(zeta__2 + 4028041154330599/4503599627370496)^2)/424643881623313 + eta__2^2 - 1)*((20282409603651670423947251286016*(zeta__2 - 4503599627213111/4503599627370496)^2)/24770038225 + (288230376151711744*(eta__2 - 7530397878711147/9007199254740992)^2)/5204731445635785 - 1)*((324518553658426726783156020576256*(zeta__2 + 4503599627365785/4503599627370496)^2)/355058649 + (36893488147419103232*(eta__2 + 4434826747744735/4503599627370496)^2)/8603290501959015 - 1)*((4611686018427387904*(eta__2 + 2213733699584161/2251799813685248)^2)/1317884237102575 + (324518553658426726783156020576256*(zeta__2 - 4503599627284663/4503599627370496)^2)/117876175561 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254735975/9007199254740992)^2)/25170289 + (576460752303423488*(eta__2 - 4066832143866835/4503599627370496)^2)/2374649627355687 - 1);
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Wxy2 = sym('Wxy2',[1 M]);
Wxy3 = sym('Wxy3',[1 M]);
Wxy2(1:M) = sym('0');
Wxy3(1:M) = sym('0');
for s=1:M
    for i=1:II+1
        for j=1:JJ+1
            Wxy2(s) = W(i, j, 2, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy2(s);
            Wxy3(s) = W(i, j, 3, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy3(s);
       end
   end
end
for r=1:M
Qn__2(r,1) = [vpaintegral(vpaintegral(Wxy2(r)*heaviside(-Hvs2)*(abs(sum(Wxy2)-sum(Wxy3))),zeta__2,-1,1),eta__2,-1,1)];
end

Mehdi el 24 de Sept. de 2022

Editada: Mehdi el 24 de Sept. de 2022

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I deleted them and used sum. now it is fine. Excuse again.

syms eta__2 zeta__2
II=10;JJ=11;M=3;
Hvs2 = ((5070602400912917605986812821504*(zeta__2 + 2251799813683713/2251799813685248)^2)/2356225 + (9007199254740992*(eta__2 + 2935286035937695/18014398509481984)^2)/196937227765191 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254732683/9007199254740992)^2)/69039481 + (576460752303423488*(eta__2 + 3261970163074917/4503599627370496)^2)/6904142590940591 - 1)*((324518553658426726783156020576256*(zeta__2 + 140737488355209/140737488355328)^2)/231983361 + (144115188075855872*(eta__2 - 262292457514301/562949953421312)^2)/2637878570603985 - 1)*((144115188075855872*(zeta__2 + 4028041154330599/4503599627370496)^2)/424643881623313 + eta__2^2 - 1)*((20282409603651670423947251286016*(zeta__2 - 4503599627213111/4503599627370496)^2)/24770038225 + (288230376151711744*(eta__2 - 7530397878711147/9007199254740992)^2)/5204731445635785 - 1)*((324518553658426726783156020576256*(zeta__2 + 4503599627365785/4503599627370496)^2)/355058649 + (36893488147419103232*(eta__2 + 4434826747744735/4503599627370496)^2)/8603290501959015 - 1)*((4611686018427387904*(eta__2 + 2213733699584161/2251799813685248)^2)/1317884237102575 + (324518553658426726783156020576256*(zeta__2 - 4503599627284663/4503599627370496)^2)/117876175561 - 1)*((81129638414606681695789005144064*(zeta__2 + 9007199254735975/9007199254740992)^2)/25170289 + (576460752303423488*(eta__2 - 4066832143866835/4503599627370496)^2)/2374649627355687 - 1);
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Wxy2 = sym('Wxy2',[1 M]);
Wxy3 = sym('Wxy3',[1 M]);
Wxy2(1:M) = sym('0');
Wxy3(1:M) = sym('0');
for s=1:M
    for i=1:II+1
        for j=1:JJ+1
            Wxy2(s) = W(i, j, 2, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy2(s);
            Wxy3(s) = W(i, j, 3, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy3(s);
       end
   end
end
for r=1:M
Qn__2(r,1) = [vpaintegral(vpaintegral(Wxy2(r)*heaviside(-Hvs2)*(abs(sum(Wxy2)-sum(Wxy3))),zeta__2,-1,1),eta__2,-1,1)];
end

Torsten el 24 de Sept. de 2022

Editada: Torsten el 24 de Sept. de 2022

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Check whether it's correctly implemented.

I don't know the runtime.

II=10;JJ=11;M=3;
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Hvs2_fun = @(x,y)((5070602400912917605986812821504.*(x + 2251799813683713./2251799813685248).^2)./2356225 + (9007199254740992.*(y + 2935286035937695./18014398509481984).^2)./196937227765191 - 1).*((81129638414606681695789005144064.*(x + 9007199254732683./9007199254740992).^2)./69039481 + (576460752303423488.*(y + 3261970163074917./4503599627370496).^2)./6904142590940591 - 1).*((324518553658426726783156020576256.*(x + 140737488355209./140737488355328).^2)./231983361 + (144115188075855872.*(y - 262292457514301./562949953421312).^2)./2637878570603985 - 1).*((144115188075855872.*(x + 4028041154330599./4503599627370496).^2)./424643881623313 + y.^2 - 1).*((20282409603651670423947251286016.*(x - 4503599627213111./4503599627370496).^2)./24770038225 + (288230376151711744.*(y - 7530397878711147./9007199254740992).^2)./5204731445635785 - 1).*((324518553658426726783156020576256.*(x + 4503599627365785./4503599627370496).^2)./355058649 + (36893488147419103232.*(y + 4434826747744735/4503599627370496).^2)./8603290501959015 - 1).*((4611686018427387904.*(y + 2213733699584161./2251799813685248).^2)./1317884237102575 + (324518553658426726783156020576256.*(x - 4503599627284663./4503599627370496).^2)./117876175561 - 1).*((81129638414606681695789005144064.*(x + 9007199254735975./9007199254740992).^2)./25170289 + (576460752303423488.*(y - 4066832143866835./4503599627370496).^2)./2374649627355687 - 1);
value = arrayfun(@(r)integral2(@(x,y)fun(x,y,r,II,JJ,M,W,q,Hvs2_fun),-1,1,-1,1),1:M);
function values = fun(x,y,r,II,JJ,M,W,q,Hvs2_fun)
  Hvs2 = Hvs2_fun(x,y);
  part1 = zeros(II+1,size(x,1),size(x,2));
  part2 = zeros(JJ+1,size(x,1),size(x,2));
  part = zeros(II+1,JJ+1,size(x,1),size(x,2));
  for ii = 1:II+1
    part1(ii,:,:) = legendreP(ii, x);
  end
  for jj= 1:JJ+1
    part2(jj,:,:) = legendreP(jj, y);
  end
  for ii = 1:II+1
    for jj = 1:JJ+1
      part(ii,jj,:,:) = part1(ii,:,:).*part2(jj,:,:);
    end
  end
  Wxy2 = zeros(M,size(x,1),size(x,2));
  Wxy3 = zeros(size(Wxy2));
  for s=1:M
    for ii=1:II+1
      for jj=1:JJ+1
        partij = reshape(part(ii,jj,:,:),1,size(x,1),size(x,2)); 
        Wxy2(s,:,:) = W(ii, jj, 2, s)*partij*q(s, 1) + Wxy2(s,:,:);
        Wxy3(s,:,:) = W(ii, jj, 3, s)*partij*q(s, 1) + Wxy3(s,:,:);
      end
    end
  end
  values = squeeze(Wxy2(r,:,:)).*heaviside(-Hvs2).*squeeze(abs(sum(Wxy2-Wxy3,1)));
end

Torsten el 25 de Sept. de 2022

Editada: Torsten el 25 de Sept. de 2022

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I don't see an error in the code (that I tried to optimize further a bit).

Note that heaviside introduces a sharp discontinuity. You must be aware that this might turn integration extremely difficult or even impossible.

II=10;JJ=11;M=3;

W=rand(II+1,JJ+1,3,M);

q=rand(M,1);

Hvs2_fun = @(x,y)sin(x.*y);

r = 2;

x = -1:0.1:1;

y = -1:0.1:1;

[X,Y] = meshgrid(x,y);

Z = fun(X,Y,r,II,JJ,M,W,q,Hvs2_fun);

surf(X,Y,Z)

function values = fun(x,y,r,II,JJ,M,W,q,Hvs2_fun)

Hvs2 = Hvs2_fun(x,y);

part1 = zeros(II+1,size(x,1),size(x,2));

part2 = zeros(JJ+1,size(x,1),size(x,2));

part = zeros(II+1,JJ+1,size(x,1),size(x,2));

for ii = 1:II+1

part1(ii,:,:) = legendreP(ii, x);

end

for jj= 1:JJ+1

part2(jj,:,:) = legendreP(jj, y);

end

for ii = 1:II+1

for jj = 1:JJ+1

part(ii,jj,:,:) = part1(ii,:,:).*part2(jj,:,:);

end

Wxy2 = zeros(M,size(x,1),size(x,2));

Wxy3 = zeros(size(Wxy2));

for s=1:M

for ii=1:II+1

for jj=1:JJ+1

partij = reshape(part(ii,jj,:,:),1,size(x,1),size(x,2));

Wxy2(s,:,:) = W(ii, jj, 2, s)*partij*q(s, 1) + Wxy2(s,:,:);

Wxy3(s,:,:) = W(ii, jj, 3, s)*partij*q(s, 1) + Wxy3(s,:,:);

end

values = squeeze(Wxy2(r,:,:)).*heaviside(-Hvs2).*squeeze(abs(sum(Wxy2-Wxy3,1)));

end

Mehdi el 28 de Sept. de 2022

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Running has not finished after waiting long time. !

II=10;JJ=11;M=3;
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Hvs2_fun = @(x,y)sin(x.*y);
r = 2;
x = -1:0.1:1;
y = -1:0.1:1;
value = arrayfun(@(r)integral2(@(x,y)fun(x,y,r,II,JJ,M,W,q,Hvs2_fun),-1,1,-1,1),1:M);
function values = fun(x,y,r,II,JJ,M,W,q,Hvs2_fun)
  Hvs2 = Hvs2_fun(x,y);
  part1 = zeros(II+1,size(x,1),size(x,2));
  part2 = zeros(JJ+1,size(x,1),size(x,2));
  part = zeros(II+1,JJ+1,size(x,1),size(x,2));
  for ii = 1:II+1
    part1(ii,:,:) = legendreP(ii, x);
  end
  for jj= 1:JJ+1
    part2(jj,:,:) = legendreP(jj, y);
  end
  for ii = 1:II+1
    for jj = 1:JJ+1
        part(ii,jj,:,:) = part1(ii,:,:).*part2(jj,:,:);
    end
  end
  Wxy2 = zeros(M,size(x,1),size(x,2));
  Wxy3 = zeros(size(Wxy2));
  for s=1:M
    for ii=1:II+1
      for jj=1:JJ+1
        partij = reshape(part(ii,jj,:,:),1,size(x,1),size(x,2)); 
        Wxy2(s,:,:) = W(ii, jj, 2, s)*partij*q(s, 1) + Wxy2(s,:,:);
        Wxy3(s,:,:) = W(ii, jj, 3, s)*partij*q(s, 1) + Wxy3(s,:,:);
      end
    end
  end
  values = squeeze(Wxy2(r,:,:)).*heaviside(-Hvs2).*squeeze(abs(sum(Wxy2-Wxy3,1)));
end

Torsten el 28 de Sept. de 2022

Editada: Torsten el 29 de Sept. de 2022

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Why do you stress your comments by exclamation marks ? Shall I feel responsible for that your assignment does not make progress ?

I don't know the exact reason why integral2 needs so long for computation. I told you that "heaviside" and "abs" are poison for every integrator.

If you are satisfied with results without error estimates, choose

x = -1:0.1:1;

y = -1:0.1:1;

evaluate the function on this mesh by calling "fun" and use trapz twice on the matrix of function values returned. This will give you an approximation of the double integral.

I think there is still a mistake in your codes, since I am looking for a Mx1 vector as result, but your codes result in 21*21!

I could reproduce this behaviour. Apparently, the "squeeze" commands to calculate "values" change dimensions not as wanted if x and y are vector inputs. Changing the last line from

values = squeeze(Wxy2(r,:,:)).*heaviside(-Hvs2).*squeeze(abs(sum(Wxy2-Wxy3,1)));

to

values = reshape(Wxy2(r,:,:),[size(x,1),size(x,2)]).*heaviside(-Hvs2).*reshape(abs(sum(Wxy2-Wxy3,1)),[size(x,1) size(x,2)]);

should remove this fault.

Mehdi el 29 de Sept. de 2022

Editada: Mehdi el 29 de Sept. de 2022

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clear
syms eta__2 zeta__2
II=1;JJ=1;M=2;
Hvs2 = sym('5070602400912917605986812821504')*(zeta__2); 
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Wxy2 = sym('Wxy2',[1 M]);
Wxy3 = sym('Wxy3',[1 M]);
Wxy2(1:M) = sym('0');
Wxy3(1:M) = sym('0');
for s=1:M
    for i=1:II+1
        for j=1:JJ+1
            Wxy2(s) = W(i, j, 2, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy2(s);
            Wxy3(s) = W(i, j, 3, s)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(s, 1) + Wxy3(s);
       end
   end
end
for r=1:M
Qn__2(r,1) = [vpaintegral(vpaintegral(Wxy2(r)*heaviside(-Hvs2)*(abs(sum(Wxy2)-sum(Wxy3))),zeta__2,-1,1),eta__2,-1,1)];
end

Torsten el 29 de Sept. de 2022

Ok, then take the way that best fits your needs.

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Answer 2

James Tursa el 23 de Sept. de 2022

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https://es.mathworks.com/matlabcentral/answers/1811020-any-comment-to-speed-up-the-speed-of-caculation-of-symbolic-loops-having-legendre-polynomials#answer_1059570

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The Symbolic Toolbox is going to be slower than IEEE floating point ... that's just something you have to accept. And if you need to have those integer numbers represented exactly you should probably create them as symbolic integers, not double precision integers. E.g., your values with more than 15 decimal digits seem to be exactly representable:

sprintf('%f',5070602400912917605986812821504)
ans = '5070602400912917605986812821504.000000'
sprintf('%f',81129638414606681695789005144064)
ans = '81129638414606681695789005144064.000000'
sprintf('%f',324518553658426726783156020576256)
ans = '324518553658426726783156020576256.000000'

So I am guessing these came from some calculation that ensures this, but to guarantee this in general you would need to do something like this instead:

sym('5070602400912917605986812821504')
ans = 5070602400912917605986812821504

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Mehdi el 23 de Sept. de 2022

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I think the problem is on loops rather than those symbolic numeric problems.

syms eta__2 zeta__2
II=10;JJ=11;M=3;
Hvs2 = sym('5070602400912917605986812821504')*(zeta__2); 
W=rand(II+1,JJ+1,3,M);
q=rand(M,1);
Wxy2 = sym('Wxy2',[1 M]);
    Wxy3 = sym('Wxy3',[1 M]);
    Wxy2(1:M) = sym('0');
    Wxy3(1:M) = sym('0');
    for r=1:M
        for i=1:II+1
            for j=1:JJ+1
                Wxy2(r) = W(i, j, 2, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy2(r);
                Wxy3(r) = W(i, j, 3, r)*legendreP(i, zeta__2)*legendreP(j, eta__2)*q(r, 1) + Wxy3(r);
            end
        end
    end  
    Qn__2 = [vpaintegral(vpaintegral(Wxy2(r)*heaviside(-Hvs2)*(abs(Wxy2-Wxy3)'),zeta__2,-1,1),eta__2,-1,1)];

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Any comment to speed up the speed of caculation of symbolic loops having Legendre polynomials?

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Any comment to speed up the speed of caculation of symbolic loops having Legendre polynomials?

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