Two sufficient conditions for the existence of Hamilton cycles in graphs

TL;DR

This paper establishes new sufficient conditions involving heavy vertices and specific subgraph structures that guarantee the existence of Hamilton cycles in certain classes of graphs.

Contribution

It introduces two novel theorems providing sufficient conditions for Hamiltonicity based on heavy vertex conditions and subgraph configurations, extending prior research.

Findings

2-connected claw-o-heavy graphs are Hamiltonian under specific subgraph conditions

3-connected 1-heavy graphs are Hamiltonian with certain vertex pair conditions

Results improve and extend previous Hamiltonicity theorems

Abstract

Let $G$ be a graph on $n\geq 3$ vertices, claw the bipartite graph $K_{1,3}$, and $Z_i$ the graph obtained from a triangle by attaching a path of length $i$ to its one vertex. $G$ is called 1-heavy if at least one end vertex of each induced claw of $G$ has degree at least $n/2$, and claw-\emph{o}-heavy if each induced claw of it has a pair of end vertices with degree sum at least $n$. In this paper we prove two results: (1) Every 2-connected claw-$o$-heavy graph $G$ is Hamiltonian if every pair of vertices $u,v$ in a subgraph $H\cong Z_1$ contained in an induced subgraph $Z_2$ of $G$ with $d_{H}(u,v)=2$ satisfies one of the following conditions: ($a$) $|N(u)\cap N(v)|\geq 2$; ($b$) $\max(d(u),d(v))\geq n/2$. (2) Every 3-connected 1-heavy graph $G$ is Hamiltonian if every pair of vertices $u,v$ in an induced subgraph $H\cong Z_2$ of $G$ with $d_{H}(u,v)=2$ satisfies one of the following conditions: ($a$) $|N(u)\cap N(v)|\geq 2$; ($b$) $\max(d(u),d(v))\geq n/2$. Our results improve or extend previous theorems of Broersma et al., Chen et al., Fan, Goodman & Hedetniemi, Gould & Jacobson and Shi on the existence of Hamilton cycles in graphs.