On Forbidden Submatrices

Abstract

Given a k× l (0,1)-matrix F, we denote by fs(m,F) the largest number for which there is an m × fs(m,F) (0,1)-matrix with no repeated columns and no induced submatrix equal to F. A conjecture of Anstee, Frankl, F\"uredi and Pach states that fs(m,F) = O(mk) for a fixed matrix F. The main results of this paper are that fs(m,F) = m2+ o(1) if k=2 and that fs(m,F) = m5k/3 -1 + o(1) if k≥ 3.