A graph-theoretic approach to a conjecture of Dixon and Pressman

Abstract

Given n × n matrices, A1, …, Ak, consider the linear operator L(A1,…,Ak) \, \; Mn Mn given by \[ L(A1,…,Ak)(Ak+1)= Σσ∈ Sk+1 sign(σ) Aσ(1)Aσ(2) ·s Aσ(k+1). \] The Amitsur-Levitzki theorem asserts that L(A1, …, Ak) is identically 0 for every k ≥ 2n-1. Dixon and Pressman conjectured that if k is an even number between 2 and 2n - 2, then the kernel of L(A1, …, Ak) is of dimension k for A1, …, Ak∈ Mn(R) in general position. We prove this conjecture using graph-theoretic techniques.