An ensemble of high rank matrices arising from tournaments

Abstract

Suppose F is a field and let a := (a1, a2, …c) be a sequence of non-zero elements in F. For an := (a1, …c, an), we consider the family Mn(a) of n × n symmetric matrices M over F with all diagonal entries zero and the (i, j)th element of M either ai or aj for i < j. In this short paper, we show that all matrices in a certain subclass of Mn(a) -- which can be naturally associated with transitive tournaments -- have rank at least 2n/3 - 1. We also show that if char(F) ≠ 2 and M is a matrix chosen uniformly at random from Mn(a), then with high probability rank(M) ≥ (12 - o(1))n.