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A Proof of Brouwer's Toughness Conjecture

Xiaofeng Gu

2021SIAM Journal on Discrete Mathematics19 citationsDOIOpen Access PDF

Abstract

The toughness $t(G)$ of a connected graph $G$ is defined as $t(G)=\min\{\frac{|S|}{c(G-S)}\}$, in which the minimum is taken over all proper subsets $S\subset V(G)$ such that $c(G-S)>1$, where $c(G-S)$ denotes the number of components of $G-S$. Let $\lambda$ denote the second largest absolute eigenvalue of the adjacency matrix of a graph. For any connected $d$-regular graph $G$, it has been shown by Alon that $t(G)>\frac{1}{3}(\frac{d^2}{d\lambda+\lambda^2}-1)$, through which, Alon was able to show that for every $t$ and $g$ there are $t$-tough graphs of girth strictly greater than $g$, and thus disproved in a strong sense a conjecture of Chv\'atal on pancyclicity. Brouwer independently discovered a better bound $t(G)>\frac{d}{\lambda}-2$ for any connected $d$-regular graph $G$, while he also conjectured that the lower bound can be improved to $t(G)\ge \frac{d}{\lambda} - 1$. We confirm this conjecture.

Topics & Concepts

MathematicsCombinatoricsConjectureAdjacency matrixDiscrete mathematicsGraphConnected componentUpper and lower boundsConnectivityGraph minorGraph theoryToughnessMatrix (chemical analysis)Graph energyAdjacency listStrongly connected componentCrossing number (knot theory)Cubic graphGraph powerSimple graphGraph theory and applicationsInterconnection Networks and SystemsGraph Labeling and Dimension Problems