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I'm trying to write a program in C to solve a PDE in 2 spatial dimentions numerically: W(x,p,t). The acctual equasion involves too many signs that I don't know how to write here, so forgive me for not providing it, but it is fairly irrelevant anyways.

To solve the equation, from what I know - I need three loops:

For (t=0;t<t_max;t+=1) 
 For (x=0;x<x_max;x+=1) 
  For (p=0;p<p_max;p+=1) 
   ( The numerical form of the equation, using a 2D array - W[x_max][p_max] ) 

This works fine for one dimension. - but problem is : in the above case the program simply runs in a million years! - I am seriously afraid I might live only to 120 - so I'll never see it complete!

What are methods to solve such equations without three nested loops? Are there any other techniques to spped up my calculation (e.g. by parallelization)? What is a good resource to learn more about solving PDEs?

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What kind of PDE is this, what method are you using to solve it? –  Andreas Brinck Aug 20 '12 at 8:01
    
BTW - I use the simple Euler method for writing the Numerical form of the PDE, no "fancy" stuff..... –  user1611107 Aug 20 '12 at 8:05
    
it goes something like this: dW/dt=-x*p*W+Dd^2/dp^2 W-d/dp F(p)*W –  user1611107 Aug 20 '12 at 8:05
    
What is t_max, x_max and p_max? how large are these variables? What are you interested in? Is it the value in a specific point or a specific area? –  stefan Aug 20 '12 at 8:13
    
The Euler method: W(n+1,j)=x*p*W(n,j)+D*Delta_t*(W(n,j+1)-2W(n,j)+W(n,j-1))/(Delta_p)^2-(d/dpF(p))‌​*W(n,j)-F(p)*(W(n,j+1)-W(n,j-1))/(2*Delta_p) –  user1611107 Aug 20 '12 at 8:15

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