Approximate Counting for Spin Systems in Sub-Quadratic Time
Abstract
We present two randomised approximate counting algorithms with running time for some constant and accuracy : (1) for the hard-core model with fugacity on graphs with maximum degree when where ; (2) for spin systems with strong spatial mixing (SSM) on planar graphs with quadratic growth, such as . For the hard-core model, Weitz's algorithm (STOC, 2006) achieves sub-quadratic running time when correlation decays faster than the neighbourhood growth, namely when . Our first algorithm does not require this property and extends the range where sub-quadratic algorithms exist. Our second algorithm appears to be the first to achieve sub-quadratic running time up to the SSM threshold, albeit on a restricted family of graphs. It also extends to (not necessarily planar) graphs with polynomial growth, such as , but with a running time of the form where is the exponent of the polynomial growth and is some constant.
Cite
@article{arxiv.2306.14867,
title = {Approximate Counting for Spin Systems in Sub-Quadratic Time},
author = {Konrad Anand and Weiming Feng and Graham Freifeld and Heng Guo and Jiaheng Wang},
journal= {arXiv preprint arXiv:2306.14867},
year = {2025}
}
Comments
27 pages. This is the TheoretiCS journal version