Sufficient conditions for t-tough graphs to be Hamiltonian and pancyclic or bipartite

Abstract

The toughness of graph G, denoted by τ(G), is τ(G)=\|S|c(G-S):S⊂eq V(G),c(G-S)≥2\ for every vertex cut S of V(G) and the number of components of G is denoted by c(G). Bondy in 1973, suggested the ``metaconjecture" that almost any nontrivial condition on a graph which implies that the graph is Hamiltonian also implies that the graph is pancyclic. Recently, Benediktovich [Discrete Applied Mathematics. 365 (2025) 130--137] confirmed the Bondy's metaconjecture for t-tough graphs in the case when t∈\1;2;3\ in terms of the size, the spectral radius and the signless Laplacian spectral radius of the graph. In this paper, we will confirm the Bondy's metaconjecture for t-tough graphs in the case when t≥4 in terms of the size, the spectral radius, the signless Laplacian spectral radius, the distance spectral radius and the distance signless Laplacian spectral radius of graphs.