A unified approach to the spectral radius, connectivity and edge-connectivity of graphs

TL;DR

This paper investigates the spectral radius bounds of graphs with specific connectivity properties, extending previous work to cases with higher connectivity parameters and providing a unified approach to spectral radius, connectivity, and edge-connectivity.

Contribution

It offers a complete solution for upper bounds of spectral radius in graphs with $h$-extra $r$-component connectivity for $h eq0$, unifying spectral and connectivity graph properties.

Findings

Established upper bounds for spectral radius in graphs with $h$-extra $r$-component connectivity for $h eq0$

Characterized extremal graphs attaining maximum spectral radius under these conditions

Extended previous results to broader classes of graphs with enhanced connectivity parameters

Abstract

For two integers $r\geq 2$ and $h\geq 0$, the \emph{$h$-extra $r$-component connectivity} $\kappa^h_r(G)$ of a graph $G$ is defined to be the minimum size of a subset of vertices whose removal disconnects $G$, and there are at least $r$ connected components in $G\!-\!S$ and each component has at least $h+1$ vertices. Denote by $\mathcal{G}_{n,\delta}^{\kappa_r^h}$ the set of graphs with $h$-extra $r$-component connectivity $\kappa^h_r(G)$ and minimum degree $\delta$. The following problem concerning spectral radius was proposed by Brualdi and Solheid [On the spectral radius of complementary acyclic matrices of zeros and one, SIAM J. Algebra Discrete Methods 7 (1986) 265-272]: Given a set of graphs $\mathscr{S}$, find an upper bound for the spectral radius of graphs in $\mathscr{S}$ and characterize the graphs in which the maximal spectral radius is attained. We study this question for $\mathscr{S}=\mathcal{G}_{n,\delta}^{\kappa_r^h}$ where $r\geq 2$ and $h\geq 0$. Fan, Gu and Lin [$l$-connectivity, $l$-edge-connectivity and spectral radius of graphs, \emph{arXiv}:2309.05247] give the answer to $r\geq 2$ and $h=0$. In this paper, we solve this problem completely for $r\geq 2$ and $h\geq1$. Moreover, we also investigate analogous problems for the edge version. Our results can break the restriction of the extremum structure of the conditional connectivity. This implies some previous results in connectivity and edge-connectivity.