The inertia set of a signed graph

Abstract

A signed graph is a pair (G,), where G=(V,E) is a graph (in which parallel edges are permitted, but loops are not) with V=1,...,n and ⊂eq E. By S(G,) we denote the set of all symmetric V× V matrices A=[ai,j] with ai,j<0 if i and j are connected by only even edges, ai,j>0 if i and j are connected by only odd edges, ai,j∈ R if i and j are connected by both even and odd edges, ai,j=0 if i=j and i and j are non-adjacent, and ai,i ∈ R for all vertices i. The stable inertia set of a signed graph (G,) is the set of all pairs (p,q) for which there exists a matrix A∈ S(G,) with p positive and q negative eigenvalues which has the Strong Arnold Property. In this paper, we study the stable inertia set of (signed) graphs.