I'd try an approach like this:

Iterate left to right row by row until you find a `0`

.

This `0`

may already identify two rectangles of `1`

s:

- all rows above it
- from the top left to the position to the left of the
`0`

One of them is bigger, remember it.

Then recursively descend into the three unknown sectors (two of them partially unknown) that may still contain a rectangle bigger than what you have already found:

Make sure you don't iterate over the known rows again, that's redundant.

I believe this solution can look at each field at most twice (where a recursion step's sectors overlap), so it should run in θ(x*y).

`C#`

, with a slightly different condition (equal sums for 0 and 1). You will find the pseudo code in the accepted answer: Largest submatrix with equal no of 1's and 0's. – Alex Filipovici Feb 6 '13 at 10:44`language-agnostic`

instead – Kos Feb 6 '13 at 11:00