Skew-signings of positive weighted digraphs

Abstract

An arc-weighted digraph is a pair (D,ω) where D is a digraph and ω is an arc-weight function that assigns\ to each arc uv of D a nonzero real number ω(uv). Given an arc-weighted digraph (D,ω) with vertices v1,…,vn, the weighted adjacency matrix of (D,ω) is defined as the matrix A(D,ω)=[aij] where aij=ω(vivj), if vivj\ an arc of D and 0 otherwise. Let (D,ω) be a positive arc-weighted digraphs and assume that D is loopless and symmetric. A skew-signing of (D,ω) is an arc-weight function ω such that ω(uv)= ω(uv) and ω(uv)ω(vu)<0 for every arc uv of D. In this paper, we give necessary and sufficient conditions under which the characteristic polynomial of A(D,ω) is the same for every skew-signing ω of (D,ω). Our Main Theorem generalizes a result of Cavers et al (2012) about skew-adjacency matrices of graphs.