Graph toughness from Laplacian eigenvalues
Combinatorics
2021-04-09 v1
Abstract
The toughness of a graph is defined as , in which the minimum is taken over all such that is disconnected, where denotes the number of components of . We present two tight lower bounds for in terms of the Laplacian eigenvalues and provide strong support for a conjecture for a better bound which, if true, implies both bounds, and improves and generalizes known bounds by Alon, Brouwer, and the first author. As applications, several new results on perfect matchings, factors and walks from Laplacian eigenvalues are obtained, which leads to a conjecture about Hamiltonicity and Laplacian eigenvalues.
Cite
@article{arxiv.2104.03845,
title = {Graph toughness from Laplacian eigenvalues},
author = {Xiaofeng Gu and Willem H. Haemers},
journal= {arXiv preprint arXiv:2104.03845},
year = {2021}
}