Sidorenko's conjecture, colorings and independent sets

Author(s)

Csikvari, Peter; Lin, Zhicong

Abstract

Let hom(H, G) denote the number of homomorphisms from a graph H to a graph G. Sidorenko’s conjecture asserts that for any bipartite graph H, and a graph G we have hom(H, G) > v(G)[superscript v(H)](hom(K[subscript 2], G)[superscript e(H)]/v(G)[superscript 2], where v(H), v(G) and e(H), e(G) denote the number of vertices and edges of the graph H and G, respectively. In this paper we prove Sidorenko’s conjecture for certain special graphs G: for the complete graph Kq on q vertices, for a K2 with a loop added at one of the end vertices, and for a path on 3 vertices with a loop added at each vertex. These cases correspond to counting colorings, independent sets and Widom-Rowlinson configurations of a graph H. For instance, for a bipartite graph H the number of q-colorings ch(H, q) satisfies ch(H, q) ≥ q[superscript v(H)](q − 1/q)[superscript e(H)]. In fact, we will prove that in the last two cases (independent sets and WidomRowlinson configurations) the graph H does not need to be bipartite. In all cases, we first prove a certain correlation inequality which implies Sidorenko’s conjecture in a stronger form.

Date issued

2017-01

URI

http://hdl.handle.net/1721.1/110146

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Electronic Journal of Combinatorics

Publisher

European Mathematical Information Service (EMIS)

Citation

Csikvari, Peter and Zhicong Lin. "Sidorenko's conjecture, colorings and independent sets." The Electronic Journal of Combinatorics 24.1 (2017): n. pag.

Version: Final published version