# MATLAB: fast and memory efficient solution of a particular linear program

I have a little programming experience, so I'm pretty sure I didn't code the problem in the optimal way, so I would be happy to hear any hints.

I have two parameters: the dimension of the problem `n` and an `N x N` matrix of constraints `B` where `N = 2n`. In my case `B` is symmetric and has only positive values. I need to solve the following problem

That is I need to maximize a certain average of the distances subject to constraints on pairwise distances given by `B(i,j)`.

They way I'm doing it now is an implementation of `linprog(-f,A,b)` where

``````f = ones([1,n])/n;
f = [f -f]
``````

and

``````b = reshape(B',numel(B),[])
``````

and `A` is defined as follows

`````` A = zeros([N^2,N]);
for i = 1:N
for j = 1:N
if i ~= j
A((i-1)*N + j,i)   =  1;
A((i-1)*N + j,j)   = -1;
end
end
end
``````

However, when `n = 500` even a simple construction of `A` takes quite some time, not to say how long does the solution of the linear program take. Any hints are highly appreciated and please feel free to retag.

-
It looks like the dimension of your solution is 2n. –  Jacob Aug 21 at 15:22
@Jacob: you're right, fixed that –  Ilya Aug 21 at 15:24

First of all, try constructing `A` like so:

``````AI = eye(N);
AV = ones(N, 1);
A = kron(AI, AV) - kron(AV, AI);
``````

I think it should run by at least an order of magnitude faster than the way you're creating it.

-
Thanks for an advice, but surprisingly it runs slower than the original definition of `A` from my post. For example, when `n = 200` and hence `N = 400` the original code constructs `A` in 0.1 seconds whereas the code you proposed runs in 2 seconds. –  Ilya Aug 22 at 13:52
@Ilya Really? O_o Let me think about it... –  Eitan T Aug 22 at 14:10
I can provide m-files if you are interested –  Ilya Aug 22 at 14:20