Maximizing the number of independent sets of fixed size in Kn-covered graphs

Abstract

A graph G is H-covered by some given graph H if each vertex in G is contained in a copy of H. In this note, we give the maximum number of independent sets of size t 3 in Kn-covered graphs of size N n+t-1 and determine its extremal graph. The result answers a question proposed by Chakraborit and Loh. The proof uses an edge-switching operation of hypergraphs which remains the number of independent sets nondecreasing.