Degree sequence condition for Hamiltonicity in tough graphs

TL;DR

This paper proves a conjecture relating degree sequence conditions to Hamiltonicity in t-tough graphs for all t≥4, extending previous results and introducing new cycle structure theorems.

Contribution

It confirms Hoàng's conjecture for all t≥4, providing a unified degree sequence condition for Hamilton cycles in tough graphs.

Findings

Confirmed Hoàng's conjecture for all t≥4

Established new results on cycle structures in tough graphs

Extended degree sequence conditions for Hamiltonicity

Abstract

Generalizing both Dirac's condition and Ore's condition for Hamilton cycles, Chv\'atal in 1972 established a degree sequence condition for the existence of a Hamilton cycle in a graph. Ho\`ang in 1995 generalized Chv\'atal's degree sequence condition for 1-tough graphs and conjectured a $t$-tough analogue for any positive integer $t\ge 1$. Ho\`ang in the same paper verified his conjecture for $t\le 3$ and recently Ho\`ang and Robin verified the conjecture for $t=4$. In this paper, we confirm the conjecture for all $t\ge 4$. The proof depends on two newly established results on cycle structures in tough graphs, which hold independent interest.