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Main Authors: Zhang, Weiyuan, Xu, Kexiang
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2604.01717
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author Zhang, Weiyuan
Xu, Kexiang
author_facet Zhang, Weiyuan
Xu, Kexiang
contents The hard-core model can be used to understand the numbers of independent sets in graphs in extremal graph theory. The occupancy fraction, defined as the logarithmic derivative of the independence polynomial of a graph, is a key quantity in hard-core model. Davies \textit{et al.} (2017) established an upper bound on the occupancy fraction for $d$-regular graphs, and Perarnau and Perkins (2018) derived a corresponding bound on it for graphs with given girth. Inspired by their work, we provide the tight upper and lower bounds on occupancy fraction in $n$-vertex graphs with independence number $α$, extending the classical results on bounds for independence polynomials. We also prove a relevant conjecture posed by Davies \textit{et al.} (2025) to this topic.
format Preprint
id arxiv_https___arxiv_org_abs_2604_01717
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle On expectations and variances in the hard-core model
Zhang, Weiyuan
Xu, Kexiang
Combinatorics
The hard-core model can be used to understand the numbers of independent sets in graphs in extremal graph theory. The occupancy fraction, defined as the logarithmic derivative of the independence polynomial of a graph, is a key quantity in hard-core model. Davies \textit{et al.} (2017) established an upper bound on the occupancy fraction for $d$-regular graphs, and Perarnau and Perkins (2018) derived a corresponding bound on it for graphs with given girth. Inspired by their work, we provide the tight upper and lower bounds on occupancy fraction in $n$-vertex graphs with independence number $α$, extending the classical results on bounds for independence polynomials. We also prove a relevant conjecture posed by Davies \textit{et al.} (2025) to this topic.
title On expectations and variances in the hard-core model
topic Combinatorics
url https://arxiv.org/abs/2604.01717