English

Sidorenko's conjecture for blow-ups

Combinatorics 2021-03-30 v3

Abstract

A celebrated conjecture of Sidorenko and Erd\H{o}s-Simonovits states that, for all bipartite graphs HH, quasirandom graphs contain asymptotically the minimum number of copies of HH taken over all graphs with the same order and edge density. This conjecture has attracted considerable interest over the last decade and is now known to hold for a broad range of bipartite graphs, with the overall trend saying that a graph satisfies the conjecture if it can be built from simple building blocks such as trees in a certain recursive fashion. Our contribution here, which goes beyond this paradigm, is to show that the conjecture holds for any bipartite graph HH with bipartition ABA \cup B where the number of vertices in BB of degree kk satisfies a certain divisibility condition for each kk. As a corollary, we have that for every bipartite graph HH with bipartition ABA \cup B, there is a positive integer pp such that the blow-up HApH_A^p formed by taking pp vertex-disjoint copies of HH and gluing all copies of AA along corresponding vertices satisfies the conjecture. Another way of viewing this latter result is that for every bipartite HH there is a positive integer pp such that an LpL^p-version of Sidorenko's conjecture holds for HH.

Keywords

Cite

@article{arxiv.1809.01259,
  title  = {Sidorenko's conjecture for blow-ups},
  author = {David Conlon and Joonkyung Lee},
  journal= {arXiv preprint arXiv:1809.01259},
  year   = {2021}
}

Comments

Reformatted for Discrete Analysis

R2 v1 2026-06-23T03:54:26.945Z