As part of a synthetic noise generation algorithm, I have to construct on the fly a lot of large non-singular square matrices

a_{ i,j} (i,j:1..n) / ∀ (i,j) a _{ i,j} ∈ ℤ and 0 ≤ a_{ i,j } ≤ k and Det[a] ≠ 0

but the a_{ i,j} should also be random following a uniform distribution in [0, k].

In its current incarnation the problem has n ≅ 300, k≅ 100.

In Mathematica, I can generate random element matrices very fast, but the problem is that I must also check for singularity. I am currently using the Determinant value for this.

The problem is that this check, for the 300x300 matrices takes something near 2 seconds, and I can't afford that.

Of course I may construct the rows by selecting a random first row and then constructing successive orthogonal rows, but I'm not sure how to guarantee that those rows will have their elements following an uniform distribution in [0,k].

I am looking for a solution in Mathematica, but just a faster algorithm for generating the matrices is also welcome.

NB> The U[0,k] condition means that taken a set of matrices, each **position** (i , j) across the set should follow a uniform distribution.

`random_matrix(ZZ, n, n, algorithm='subspaces', rank=n)`

, but for large`n`

this is really slow... I'm sure the experts would be able to show you a better way. – Simon Feb 27 '11 at 8:30