Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

This is an interview question: given a boolean matrix find the size of the largest contiguous square sub-matrix, which contains only "true" elements.

I found this question on SO but did not understand the answer. The proposed algorithm moves a diagonal line from the left top to the right bottom and keeps track of the rectangles of "true" elements as the line goes.

My questions:

  • How to keep track of the rectangles in the algorithm?
  • Why do we move the diagonal line? What if we move a vertical/horizontal line or both?
  • How to calculate the algorithm complexity?
share|improve this question
duplicate: stackoverflow.com/questions/3806520/… –  Klark Jul 29 '12 at 19:35
@SINTER Thanks. The most interesting part of the answer is not clear though. They say there is a DP solution of O(N*N) for square sub-matrix but did not elaborate on that. I think that is exactly I am looking for. –  Michael Jul 30 '12 at 6:14

1 Answer 1

up vote 3 down vote accepted

I can't understand the answer in the link you posted, and I don't think the complexity given there is optimal for your problem. (It claim that there is an O(N^(3/2)*logN) algorithm where N=n*n is the number of elements in the original matrix.)

For your largest square sub-matrix problem, there is a DP algorithm whose complexity is linear with the number of elements:

Let the original matrix is A[n][n], we are trying to find a matrix B[n][n], where B[i][j] indicates the size of largest square sub-matrix whose bottom-right element is A[i][j]. So

for (i = 0 ; i < n ; ++i)
  for (j = 0 ; j < n ; ++j) 
    if (A[i][j] == 0) B[i][j] = 0;
    else {
      if (B[i-1][j] != B[i][j-1]) {
        B[i][j] = min(B[i-1][j], B[i][j-1]) + 1
      } else {
        if (A[i-B[i-1][j]][j-B[i-1][j]] == 1)
          B[i][j] = B[i-1][j] + 1;
          B[i][j] = B[i-1][j];

And the largest B[i][j] is the answer.

p.s. I didn't check the array range for simplification. You can just consider the out-of-range elements are zero.

share|improve this answer
Great! Thanks a lot. Looks like the solution I am looking for. –  Michael Jul 30 '12 at 12:25

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.