Extremality of graph entropy based on degrees of uniform hypergraphs with few edges

Abstract

Let H be a hypergraph with n vertices. Suppose that d1,d2,…,dn are degrees of the vertices of H. The t-th graph entropy based on degrees of H is defined as Idt(H) =-Σi=1n(ditΣj=1ndjtditΣj=1ndjt) =(Σi=1ndit)-Σi=1n(ditΣj=1ndjt dit), where t is a real number and the logarithm is taken to the base two. In this paper we obtain upper and lower bounds of Idt(H) for t=1, when H is among all uniform supertrees, unicyclic uniform hypergraphs and bicyclic uniform hypergraphs, respectively.