Spectral Radii of Arithmetical Structures on Cycle Graphs
Abstract
Let G be a finite, connected graph. An arithmetical structure on G is a pair of positive integer-valued vectors (d,r) such that (diag(d)-AG)· r=0, where the entries of r have 1 and AG is the adjacency matrix of G. In this article we find the arithmetical structures that maximize and minimize the spectral radius of (diag(d)-AG) among all arithmetical structures on the cycle graph Cn.
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