Approximate Counting for Spin Systems in Sub-Quadratic Time

TL;DR

This paper introduces two randomized algorithms for approximate counting in spin systems that operate in sub-quadratic time, extending the range of models and graph classes where efficient algorithms are available.

Contribution

It presents novel sub-quadratic algorithms for the hard-core model and spin systems with strong spatial mixing, surpassing previous correlation decay limitations and applying to broader graph families.

Findings

First algorithm extends sub-quadratic range for the hard-core model.

Second algorithm achieves sub-quadratic time up to the SSM threshold.

Algorithms apply to polynomial growth graphs like z and .

Abstract

We present two randomised approximate counting algorithms with $\widetilde{O}(n^{2-c}/\varepsilon^2)$ running time for some constant $c>0$ and accuracy $\varepsilon$: (1) for the hard-core model with fugacity $\lambda$ on graphs with maximum degree $\Delta$ when $\lambda=O(\Delta^{-1.5-c_1})$ where $c_1=c/(2-2c)$; (2) for spin systems with strong spatial mixing (SSM) on planar graphs with quadratic growth, such as $\mathbb{Z}^2$. 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 $\lambda = o(\Delta^{-2})$. 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 $\mathbb{Z}^d$, but with a running time of the form $\widetilde{O}\left(n^2\varepsilon^{-2}/2^{c(\log n)^{1/d}}\right)$ where $d$ is the exponent of the polynomial growth and $c>0$ is some constant.