Vertex-connectivity and Q-index of graphs with fixed girth

Abstract

Let q(G) denote the Q-index of a graph G, which is the largest signless Laplacian eigenvalue of G. We prove best possible upper bounds of q(G) and best possible lower bounds of q(G) for a connected graph G to be k-connected and maximally connected, respectively. Similar upper bounds of q(G) and lower bounds of q(G) to assure G to be super-connected are also obtained. Upper bounds of q(G) and lower bounds of q(G) to assure a connected triangle-free graph G to be k-connected, maximally connected and super-connected are also respectively investigated.