Solution to a conjecture on the maximum skew-spectral radius of odd-cycle graphs

Abstract

Let G be a simple graph with no even cycle, called an odd-cycle graph. Cavers et al. [Cavers et al. Skew-adjacency matrices of graphs, Linear Algebra Appl. 436(2012), 4512--1829] showed that the spectral radius of Gσ is the same for every orientation σ of G, and equals the maximum matching root of G. They proposed a conjecture that the graphs which attain the maximum skew spectral radius among the odd-cycle graphs G of order n are isomorphic to the odd-cycle graph with one vertex degree n-1 and size m= 3(n-1)/2. This paper, by using the Kelmans transformation, gives a proof of the conjecture. Moreover, sharp upper bounds of the maximum matching roots of the odd-cycle graphs with given order n and size m are given and extremal graphs are characterized.