Some Criteria for a Signed Graph to Have Full Rank

Abstract

A weighted graph Gω consists of a simple graph G with a weight ω, which is a mapping,ω: E(G)→Z\0\. A signed graph is a graph whose edges are labeled with -1 or 1. In this paper, we characterize graphs which have a sign such that their signed adjacency matrix has full rank, and graphs which have a weight such that their weighted adjacency matrix does not have full rank. We show that for any arbitrary simple graph G, there is a sign σ so that Gσ has full rank if and only if G has a \1,2\-factor. We also show that for a graph G, there is a weight ω so that Gω does not have full rank if and only if G has at least two \1,2\-factors.