Sharp lower bounds on the spectral radius of uniform hypergraphs concerning degrees

Abstract

Let A(H) and Q(H) be the adjacency tensor and signless Laplacian tensor of an r-uniform hypergraph H. Denote by (H) and (Q(H)) the spectral radii of A(H) and Q(H), respectively. In this paper we present a lower bound on (H) in terms of vertex degrees and we characterize the extremal hypergraphs attaining the bound, which solves a problem posed by Nikiforov [V. Nikiforov, Analytic methods for uniform hypergraphs, Linear Algebra Appl. 457 (2014) 455-535]. Also, we prove a lower bound on (Q(H)) concerning degrees and give a characterization of the extremal hypergraphs attaining the bound.