English

Sparse graph limits, entropy maximization and transitive graphs

Combinatorics 2015-04-06 v1 Group Theory Probability

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 kk-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 HH is a bipartite graph, P1P_1 is the edge and tt is the homomorphism density function then the supremum of logt(H,G)/logt(P1,G)\log t(H,G)/\log t(P_1,G) in the set of all graphs GG 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.

Keywords

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}
}
R2 v1 2026-06-22T09:09:37.929Z