On the spectral radius of uniform weighted hypergraph

Abstract

Let Qk,n be the set of the connected k-uniform weighted hypergraphs with n vertices, where k,n≥ 3. For a hypergraph G∈ Qk,n, let A(G), L (G) and Q (G) be its adjacency tensor, Laplacian tensor and signless Laplacian tensor, respectively. The spectral radii of A(G) and Q (G) are investigated. Some basic properties of the H-eigenvalue, the H+-eigenvalue and the H++-eigenvalue of A(G), L (G) and Q (G) are presented. Several lower and upper bounds of the H-eigenvalue, the H+-eigenvalue and the H++-eigenvalue for A(G), L (G) and Q (G) are established. The largest H+-eigenvalue of L (G) and the smallest H+-eigenvalue of Q (G) are characterized. A relationship among the H-eigenvalues of L (G), Q (G) and A (G) is also given.