On the spectral radius of clique trees with a given zero forcing number
Abstract
Let G(n,k) be the class of clique trees on n vertices and zero forcing number k, where n2 + 1 k n-1 and each block is a clique of size at least 3. In this article, we proved the existence and uniqueness of a clique tree in G(n,k) that attains maximal spectral radius among all graphs in G(n,k). We also provide an upper bound for the spectral radius of the extremal graph.
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