Improved lower bounds on extremal functions of multidimensional permutation matrices

Abstract

A d-dimensional zero-one matrix A avoids another d-dimensional zero-one matrix P if no submatrix of A can be transformed to P by changing some ones to zeroes. Let f(n,P,d) denote the maximum number of ones in a d-dimensional n × ·s × n zero-one matrix that avoids P. Fox proved for n sufficiently large that f(n, P, 2) = 2k(1)n for almost all k × k permutation matrices P. We extend this result by proving for d ≥ 2 and n sufficiently large that f(n, P, d) = 2k(1)nd-1 for almost all d-dimensional permutation matrices P of dimensions k × ·s × k.