Given a large sparse matrix (say 10k+ by 1M+) I need to find a subset, not necessarily continuous, of the rows and columns that form a dense matrix (all non-zero elements). I want this sub matrix to be as large as possible (not the largest sum, but the largest number of elements) within some aspect ratio constraints.

*Are there any known exact or aproxamate solutions to this problem?*

A quick scan on Google seems to give a lot of close-but-not-exactly results. *What terms should I be looking for?*

*edit:* Just to clarify; the sub matrix *need not be continuous*. In fact the row and column order is completely arbitrary so adjacency is completely irrelevant.

A thought based on Chad Okere's idea

- Order the rows from largest count to smallest count (not necessary but might help perf)
- Select two rows that have a "large" overlap
- Add all other rows that won't reduce the overlap
- Record that set
- Add whatever row reduces the overlap by the least
- Repeat at #3 until the result gets to small
- Start over at #2 with a different starting pair
- Continue until you decide the result is good enough