Sparse graph limits, entropy maximization and transitive graphs
Abstract
In this paper we describe a triple correspondence between graph limits, information theory and group theory. We put forward a new graph limit concept called log-convergence that is closely connected to dense graph limits but its main applications are in the study of sparse graph sequences. We present an information theoretic limit concept for -tuples of random variables that is based on the entropy maximization problem for joint distributions of random variables where a system of marginal distributions is prescribed. We give a fruitful correspondence between the two limit concepts that has a group theoretic nature. Our applications are in graph theory and information theory. We shows that if is a bipartite graph, is the edge and is the homomorphism density function then the supremum of in the set of all graphs is the same as in the set of graphs that are both edge and vertex transitive. This result gives a group theoretic approach to Sidorenko's famous conjecture. We obtain information theoretic inequalities regarding the entropy maximization problem. We investigate the limits of sparse random graphs and discuss quasi-randomness in our framework.
Cite
@article{arxiv.1504.00858,
title = {Sparse graph limits, entropy maximization and transitive graphs},
author = {Balazs Szegedy},
journal= {arXiv preprint arXiv:1504.00858},
year = {2015}
}