Zero-sum squares in \-1, 1\-matrices with low discrepancy

Abstract

Given a matrix M = (ai,j) a square is a 2 × 2 submatrix with entries ai,j, ai, j+s, ai+s, j, ai+s, j +s for some s ≥ 1, and a zero-sum square is a square where the entries sum to 0. Recently, Ar\'evalo, Montejano and Rold\'an-Pensado proved that all large n × n \-1,1\-matrices M with discrepancy |Σ ai,j| ≤ n contain a zero-sum square unless they are split. We improve this bound by showing that all large n × n \-1,1\-matrices M with discrepancy at most n2/4 are either split or contain a zero-sum square. Since zero-sum square free matrices with discrepancy at most n2/2 are already known, this bound is asymptotically optimal.