The maximum number of s-cliques in connected graphs and its application to spectral moment

Abstract

Extremal problems concerning the number of complete subgraphs have a long story in extremal graph theory. Let ks(G) be the number of s-cliques in a graph G and m=rm s+tm, where 0 tm≤ rm. Edros showed that ks(G) rm s+tms-1 over all graphs of size m and order n≥ rm+1. %Clearly, Krmtm (n-rm-1)K1 is an extremal graph, where Krmtm is the graph by joining a new vertex to tm vertices of Krm. It is natural to consider an improvement in connected situation: what is the maximum number of s-cliques over all connected graphs of size m and order n? In this paper, the sharp upper bound of ks(G) is obtained and extremal graphs are completely characterized. The technique and the bound are different from those in general case. As an application, this result can be used to solve a question on spectral moment.