A strengthening of a degree sequence condition for Hamiltonicity in tough graphs
Abstract
Generalizing Chv\'atal's classic 1972 result, Ho\`ang proposed in 1995 the following conjecture, which strengthens Chv\'atal's result in terms of toughness: Let t 1 be a positive integer and G be a t-tough graph on n 3 vertices with degree sequence d1, d2, …, dn in non-increasing order. Suppose for each i∈ [1, n-12 ], if di i and dn-i+t < n - i implies dj + dn-j+t n for all j∈ [i+1, n-12 ], then G is Hamiltonian. Ho\`ang verified the conjecture for t=1. In this paper, we verfity the conjecture for all t 4. Our proof relies on a toughness closure lemma for t 4 that we previously established. Additionally, we show that the toughness closure lemma does not hold when t=1.
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