Spectral radius and Hamiltonicity of uniform hypergraphs

Abstract

Let n and r be integers with n-2 r 3. We prove that any r-uniform hypergraph H on n vertices with spectral radius λ(H) > n-2r-1 must contain a Hamiltonian Berge cycle unless H is the complete graph Kn-1r with one additional edge. This generalizes a result proved by Fiedler and Nikiforov for graphs. As part of our proof, we show that if |H| > n-1r, then H contains a Hamiltonian Berge cycle unless H is the complete graph Kn-1r with one additional edge, generalizing a classical theorem for graphs.

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