Local maximum of inducibility profiles

Abstract

For a graph G and e∈ [0,1], denote by IG(e) the supremum of induced density of G over n-vertex graphs with edge density e as n goes to infinity. Liu, Mubayi and Reiher asked if there exists a graph G, where IG(e) has a non-trivial local maximum. In this paper, we answer this problem affirmatively. We first show that IK2,2,1(e) has at least two local maxima in (0,1). Part of this proof is using flag algebras. Additionally, we determine IK2,2,1(e), when e=(k-1)/k for every integer k 3. We also prove that IKt-(e) has a non-global local maximum for every t∈\5,8,11,…, 74\. The proof combines a symmetrization theorem of Schelp and Thomason with Reiher's clique density theorem.