Deterministic counting from coupling independence
Data Structures and Algorithms
2025-04-08 v2 Discrete Mathematics
Abstract
We show that spin systems with bounded degrees and coupling independence admit fully polynomial time approximation schemes (FPTAS). We design a new recursive deterministic counting algorithm to achieve this. As applications, we give the first FPTASes for -colourings on graphs of bounded maximum degree , when for some small , or when and , and on graphs with sufficiently large (but constant) girth, when . These bounds match the current best randomised approximate counting algorithms by Chen, Delcourt, Moitra, Perarnau, and Postle (2019), Carlson and Vigoda (2024), and Chen, Liu, Mani, and Moitra (2023), respectively.
Cite
@article{arxiv.2410.23225,
title = {Deterministic counting from coupling independence},
author = {Xiaoyu Chen and Weiming Feng and Heng Guo and Xinyuan Zhang and Zongrui Zou},
journal= {arXiv preprint arXiv:2410.23225},
year = {2025}
}