Sidorenko Inequalities for Two-Sided Group Correlation Kernels

Abstract

Sidorenko's conjecture asserts that every bipartite graph has at least the expected homomorphism density in every graph of a given edge density. Motivated by Cayley-type formulations of Sidorenko-type inequalities, we study a two-sided correlation construction on finite groups. Let Γ be a finite group and let f:Γ be a real-valued function. We define a directed kernel on Γ by Cf(x,y)=|Γ|-1Σa1,a2∈Γ:\, xa1=a2y f(a1)f(a2)=Ez∈Γ f(x-1z)f(zy-1). When f=1A, this is the normalized size of the intersection xA Ay. We prove that, for every finite directed graph F, t(F, Cf)≥ t(K2, Cf)e(F)=(Eg∈Γf(g))2e(F). Equivalently, if Wf×(x,y)=f(xy) is the directed product Cayley kernel on Γ, then the directed 1-subdivision of every finite directed graph satisfies the same homomorphism-density lower bound in Wf×.