Some new sufficient conditions for 2p-Hamilton-biconnectedness of graphs

Abstract

A balanced bipartite graph G is said to be 2p-Hamilton-biconnected if for any balanced subset W of size 2p of V(G), the subgraph induced by V(G) W is Hamilton-biconnected. In this paper, we prove that "Let p≥0 and G be a balanced bipartite graph of order 2n with minimum degree δ(G)≥ k, where n≥ 2k-p+2 and k≥ p. If the number of edges e(G)>n(n-k+p-1)+(k+2)(k-p+1), then G is 2p-Hamilton-biconnected except some exceptions." Furthermore, this result is used to present two new spectral conditions for a graph to 2p-Hamilton-biconnected. Moreover, the similar results are also presented for nearly balanced bipartite graphs.