Inertia indices of signed graphs with given cyclomatic number and given number of pendant vertices

Abstract

Let =(G, σ) be a signed graph of order n with underlying graph G and a sign function σ: E(G)→ \+, -\. Denoted by i+(), θ() and p() the positive inertia index, the cyclomatic number and the number of pendant vertices of , respectively. In this article, we prove that i+(), θ() and p() are related by the inequality i+()≥ n-p()2-θ(). Furthermore, we completely characterize the signed graph for which i+()=n-p()2-θ(). As a by-product, the inequalities i-()≥ n-p()2-θ() and η()≤ p()+2θ() are also obtained, respectively.