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The spectral even cycle problem

Sebastian Cioab, Dheer Noal Desai, Michael Tait

2024Combinatorial Theory12 citationsDOIOpen Access PDF

Abstract

In this paper, we study the maximum adjacency spectral radii of graphs of large order that do not contain an even cycle of given length. For \(n›k\), let \(S_{n,k}\) be the join of a clique on \(k\) vertices with an independent set of \(n-k\) vertices and denote by \(S_{n,k}^+\) the graph obtained from \(S_{n,k}\) by adding one edge. In 2010, Nikiforov conjectured that for \(n\) large enough, the \(C_{2k+2}\)-free graph of maximum spectral radius is \(S_{n,k}^+\) and that the \(\{C_{2k+1},C_{2k+2}\}\)-free graph of maximum spectral radius is \(S_{n,k}\). We solve this two-part conjecture.Mathematics Subject Classifications: 05C35, 05C50Keywords: Spectral Turán number, even-cycle problem, Brualdi-Solheid problem

Topics & Concepts

Environmental scienceComputer scienceMatrix Theory and AlgorithmsSpectral Theory in Mathematical Physics
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