A Spectral Moore Bound for Bipartite Semiregular Graphs
Abstract
Let b(k,,θ) be the maximum number of vertices of valency k in a (k,)-semiregular bipartite graph with second largest eigenvalue θ. We obtain an upper bound for b(k,,θ) for 0 < θ < k-1 + -1. This bound is tight when there exists a distance-biregular graph with particular parameters, and we develop the necessary properties of distance-biregular graphs to prove this.
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