Pure pairs. VII. Homogeneous submatrices in 0/1-matrices with a forbidden submatrix
Abstract
For integer n>0, let f(n) be the number of rows of the largest all-0 or all-1 square submatrix of M, minimized over all n× n 0/1-matrices M. Thus f(n)= O( n). But let us fix a matrix H, and define fH(n) to be the same, minimized over over all n× n 0/1-matrices M such that neither M nor its complement (that is, change all 0's to 1's and vice versa) contains H as a submatrix. It is known that fH(n) ε nc, where c, ε>0 are constants depending on H. When can we take c=1? If so, then one of H and its complement must be an acyclic matrix (that is, the corresponding bipartite graph is a forest). Korandi, Pach, and Tomon conjectured the converse, that fH(n) is linear in n for every acyclic matrix H; and they proved it for certain matrices H with only two rows. Their conjecture remains open, but we show fH(n)=n1-o(1) for every acyclic matrix H; and indeed there is a 0/1-submatrix that is either (n)× n1-o(1) or n1-o(1)× (n).
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