The spectral inducibility of graphs

Abstract

We introduce a spectral version of the classical inducibility problem. Given an -vertex graph F and an n-vertex graph G, let HF(G) be the -uniform hypergraph whose edges are the -sets inducing a copy of F in G. We study the maximum possible α-spectral radius of HF(G) over all n-vertex graphs G. For fixed G, this spectral parameter tends to ! times the number of induced copies of F in G as α∞, and therefore refines the usual induced-copy count. Our main result is a spectral analogue of the Brown--Sidorenko reduction: for every complete multipartite graph F, every n, and every α1, a spectral extremal graph can be chosen to be complete multipartite. We also show that the leading asymptotic constant is the ordinary inducibility i(F), and obtain exact multipartite reductions for stars K1,t and balanced complete r-partite graphs Ka,…,a with r 2a-1.