Counting Homomorphisms to Square-Free Graphs, Modulo 2
Abstract
We study the problem HomsTo of counting, modulo 2, the homomorphisms from an input graph to a fixed undirected graph . A characteristic feature of modular counting is that cancellations make wider classes of instances tractable than is the case for exact (non-modular) counting, so subtle dichotomy theorems can arise. We show the following dichotomy: for any that contains no 4-cycles, HomsTo is either in polynomial time or is -complete. This confirms a conjecture of Faben and Jerrum that was previously only known to hold for trees and for a restricted class of treewidth-2 graphs called cactus graphs. We confirm the conjecture for a rich class of graphs including graphs of unbounded treewidth. In particular, we focus on square-free graphs, which are graphs without 4-cycles. These graphs arise frequently in combinatorics, for example in connection with the strong perfect graph theorem and in certain graph algorithms. Previous dichotomy theorems required the graph to be tree-like so that tree-like decompositions could be exploited in the proof. We prove the conjecture for a much richer class of graphs by adopting a much more general approach.
Cite
@article{arxiv.1501.07539,
title = {Counting Homomorphisms to Square-Free Graphs, Modulo 2},
author = {Andreas Göbel and Leslie Ann Goldberg and David Richerby},
journal= {arXiv preprint arXiv:1501.07539},
year = {2015}
}
Comments
32 pages, 8 figures (v4 adds Corollary 3.7 to fix a bug in the proof of Lemma 5.15; v3 is a minor update; v2 corrects a typo: we wrote "dist" instead of "dom" for the domain of a function in v1)