A Fan-type condition involving bipartite independence number for hamiltonicity in graphs

Abstract

The bipartite independence number of a graph G, denoted by α(G), is defined as the smallest integer q for which there exist positive integers s and t with s + t = q + 1, such that for any two disjoint subsets A, B ⊂eq V(G) with |A| = s and |B| = t, there exists an edge between A and B. In this paper, we prove that for a 2-connected graph G of order at least three, if \dG(x), dG(y)\ α(G) for every pair of nonadjacent vertices x, y at distance two, then G is hamiltonian. Moreover, we prove that if G is 3-connected and \dG(x), dG(y)\ α(G)+1 for every pair of nonadjacent vertices x, y at distance two, then G is hamiltonian-connected. Our results generalize the recent work by Li and Liu.