Counting induced subgraphs with given intersection sizes

Abstract

Let F be a graph of order r. In this paper, we study the maximum number of induced copies of F with restricted intersections, which highlights the motivation from extremal set theory. Let L=\1,…,s\⊂eq[0,r-1] be an integer set with s∈\1,r\. Let r(n,F,L) be the maximum number of induced copies of F in an n-vertex graph, where the induced copies of F are L-intersecting as a family of r-subsets, i.e., for any two induced copies of F, the size of their intersection is in L. Helliar and Liu initiated a study of the function r(n,Kr,L). Very recently, Zhao and Zhang improved their result and showed that r(n,Kr,L)=r,L(ns) if and only if 1,…,s,r form an arithmetic progression. In this paper, we show that r(n,F,L)=or,L(ns) when 1,…,s,r do not form an arithmetic progression. We study the asymptotical result of r(n,Cr,L), and determined the asymptotically optimal result when 1,…,s,r form an arithmetic progression and take certain values. We also study the generalized Tur\'an problem, determining the maximum number of H, where the copies of H are L-intersecting as a family of r-subsets. The entropy method is used to prove our results.