I have a set of items of size N. The items are sorted by probability. A square matrix m[N][N] of those items, in C style memory organization, would have elements with similar probabilities spread out. For example m[0][100] will be very far from m[100][0] and all others with similar probability. I need to permutate the elements in a simple way so the more likely ones tend to be closer to 0. It doesn't need to be a square matrix, it can be a vector [N*N]. And it doesn't need to be perfect, just good enough that elements with similar probability are somewhat grouped together.

I'm looking for a function f(i,j) to give the position on the permutated matrix/vector. If possible with very simple operations (e.g. no squares and division but programatic conditionals are OK)

For a more graphical reference, I'm looking for something like this. [From BBC's The Story of Maths on Cantor's argument]

But it doesn't need to be exactly that permutation. Just that the elements walked on the diagonals are mostly grouped nearby.

Well, I know this is probably something very simple but it's been many years since school/uni and Wolframalpha isn't helping.

Thanks!

`m[0][100]`

and`m[100][0]`

have the same key (probability here -- I think that calling it probability here is confusing the situation). So if you call your indexesiandjthen the key you want to sort by is`i+j`

. Is this correct? – nategoose Dec 10 '10 at 18:53