Faber-Krahn type inequality for supertrees

Abstract

The Faber-Krahn inequality states that the first Dirichlet eigenvalue among all bounded domains is no less than a Euclidean ball with the same volume in Rn Chavel FB. Bykoglu and Leydold (J. Comb. Theory, Ser. B., 2007) demonstrated that the Faber-Krahn inequality also holds for the class of trees with boundary with the same degree sequence and characterized the unique extremal tree. Bykoglu and Leydold (2007) also posed a question as follows: Give a characterization of all graphs in a given class C with the Faber-Krahn property. In this paper, we address this question specifically for k-uniform supertrees with boundary. We introduce a spiral-like ordering (SLO-ordering) of vertices for supertrees, an extension of the SLO-ordering for trees initially proposed by Pruss [ Duke Math. J., 1998], and prove that the SLO-supertree has the Faber-Krahn property among all supertrees with a given degree sequence. Furthermore, among degree sequences that have a minimum degree d for interior vertices, the SLO-supertree with degree sequence (d,…,d, d', 1, …, 1) possesses the Faber-Krahn property.

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