Counting independent sets in graphs with bounded bipartite pathwidth
Abstract
We show that a simple Markov chain, the Glauber dynamics, can efficiently sample independent sets almost uniformly at random in polynomial time for graphs in a certain class. The class is determined by boundedness of a new graph parameter called bipartite pathwidth. This result, which we prove for the more general hardcore distribution with fugacity , can be viewed as a strong generalisation of Jerrum and Sinclair's work on approximately counting matchings, that is, independent sets in line graphs. The class of graphs with bounded bipartite pathwidth includes claw-free graphs, which generalise line graphs. We consider two further generalisations of claw-free graphs and prove that these classes have bounded bipartite pathwidth. We also show how to extend all our results to polynomially-bounded vertex weights.
Keywords
Cite
@article{arxiv.1812.03195,
title = {Counting independent sets in graphs with bounded bipartite pathwidth},
author = {Martin Dyer and Catherine Greenhill and Haiko Müller},
journal= {arXiv preprint arXiv:1812.03195},
year = {2020}
}
Comments
39 pages, 7 figures