How Can I Speed up a loop that solves a pde?
Mostrar comentarios más antiguos
Hello,
I am solving the 4th order pde for plate vibration and after discretizing the pde and solving for W(x,y,t) or W(k,m,n+1) as a function of W(k,m,n) and W(k,m,n-1) I get a double for loop like
for k=3:K-3
for m=3:M-3
Wnp1(k,m)=coe(1,3)*Wn(k-2,m)...
+ coe(2,2)*Wn(k-1,m-1) + coe(2,3)*Wn(k-1,m) + coe(2,4)*Wn(k-1,m+1)...
+coe(3,1)*Wn(k,m-2) + coe(3,2)*Wn(k,m-1)+coe(3,3)*Wn(k,m)...
+coe(3,4)*Wn(k,m+1)+coe(3,5)*Wn(k,m+2)...
+coe(4,2)*Wn(k+1,m-1)+coe(4,3)*Wn(k+1,m)+coe(4,4)*Wn(k+1,m+1)...
+coe(5,3)*Wn(k+2,m)...
+cNm1*Wnm1(k,m)+SWW(k,m);
end
end
where coe is a 5x5 matrix with several zeros that contains the coefficients in the finite difference approximation to the pde and Wn(k,m) represents the displacement at position k,m at time n.
I was hoping to find a way to use matrix multiplication that might speed things up but I am stumped. Does anyone have any suggestions?
Thanks,
Dave
1 comentario
Jan
el 24 de Nov. de 2014
Do you pre-allocate the output Wnp1?
Respuestas (1)
Zoltán Csáti
el 24 de Nov. de 2014
0 votos
When you did your calculations on paper, you probably wrote the problem as a linear system. Try to create the coefficient matrix in a vectorized manner. Or if you cannot do it, attach an image of the coeff. matrix so that we can see it.
Categorías
Más información sobre Eigenvalue Problems en Centro de ayuda y File Exchange.
Productos
el 21 de Nov. de 2014
el 24 de Nov. de 2014
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
