Many Hamiltonian subsets in large graphs with given density

Abstract

A set of vertices in a graph is a Hamiltonian subset if it induces a subgraph containing a Hamiltonian cycle. Kim, Liu, Sharifzadeh and Staden proved that among all graphs with minimum degree d, Kd+1 minimises the number of Hamiltonian subsets. We prove a near optimal lower bound that takes also the order and the structure of a graph into account. For many natural graph classes, it provides a much better bound than the extremal one (≈ 2d+1). Among others, our bound implies that an n-vertex C4-free graphs with minimum degree d contains at least n2d2-o(1) Hamiltonian subsets.