Algorithms for hard-constraint point processes via discretization
Abstract
We study algorithmic applications of a natural discretization for the hard-sphere model and the Widom-Rowlinson model in a region . These models are used in statistical physics to describe mixtures of one or multiple particle types subjected to hard-core interactions. For each type, particles follow a Poisson point process with a type specific activity parameter (fugacity). The Gibbs distribution is characterized by the mixture of these point processes conditioned that no two particles are closer than a type-dependent distance threshold. A key part in better understanding the Gibbs distribution is its normalizing constant, called partition function. We give sufficient conditions that the partition function of a discrete hard-core model on a geometric graph based on a point set closely approximates those of such continuous models. Previously, this was only shown for the hard-sphere model on cubic regions when is exponential in the volume of the region , limiting algorithmic applications. In the same setting, our refined analysis only requires a quadratic number of points, which we argue to be tight. We use our improved discretization results to approximate the partition functions of the hard-sphere model and the Widom-Rowlinson efficiently in . For the hard-sphere model, we obtain the first quasi-polynomial deterministic approximation algorithm for the entire fugacity regime for which, so far, only randomized approximations are known. Furthermore, we simplify a recently introduced fully polynomial randomized approximation algorithm. Similarly, we obtain the best known deterministic and randomized approximation bounds for the Widom-Rowlinson model. Moreover, we obtain approximate sampling algorithms for the respective spin systems within the same fugacity regimes.
Cite
@article{arxiv.2107.08848,
title = {Algorithms for hard-constraint point processes via discretization},
author = {Tobias Friedrich and Andreas Göbel and Maximilian Katzmann and Martin S. Krejca and Marcus Pappik},
journal= {arXiv preprint arXiv:2107.08848},
year = {2022}
}