The uniform supertrees with the extremal spectral radius
Abstract
For a hypergraph G=(V, E) consisting of a nonempty vertex set V=V(G) and an edge set E=E(G), its adjacency matrix AG=[( AG)ij] is defined as ( AG)ij=Σe∈ Eij1|e| - 1, where Eij = \e ∈ E : i, j ∈ e\. The spectral radius of a hypergraph G, denoted by ( G), is the maximum modulus among all eigenvalues of AG. In this paper, among all k-uniform (k≥ 3) supertrees with fixed number of vertices, the supertrees with the maximum, the second maximum and the minimum spectral radius are completely determined, respectively.
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