Graph norms and Sidorenko's conjecture
Abstract
Let and be two finite graphs. Define to be the number of homomorphisms from to . The function extends in a natural way to a function from the set of symmetric matrices to such that for , the adjacency matrix of a graph , we have . Let be the number of edges of . It is easy to see that when is the cycle of length , then is the -th Schatten-von Neumann norm. We investigate a question of Lov\'{a}sz that asks for a characterization of graphs for which the function is a norm. We prove that is a norm if and only if a H\"{o}lder type inequality holds for . We use this inequality to prove both positive and negative results, showing that is a norm for certain classes of graphs, and giving some necessary conditions on the structure of when is a norm. As an application we use the inequality to verify a conjecture of Sidorenko for certain graphs including hypercubes. In fact for such graphs we can prove statements that are much stronger than the assertion of Sidorenko's conjecture. We also investigate the norms from a Banach space theoretic point of view, determining their moduli of smoothness and convexity. This generalizes the previously known result for the -th Schatten-von Neumann norms.
Cite
@article{arxiv.0806.0047,
title = {Graph norms and Sidorenko's conjecture},
author = {Hamed Hatami},
journal= {arXiv preprint arXiv:0806.0047},
year = {2008}
}
Comments
to appear in Israel Journal of Mathematics