Two-dimensional Coulomb gases with multiple outposts

TL;DR

This paper extends the analysis of two-dimensional Coulomb gases with outposts to multiple outposts, showing that particle counts near each outpost are strongly correlated and converge to a multidimensional Heine distribution.

Contribution

It generalizes previous work from a single outpost to multiple outposts, revealing strong correlations in particle distributions across outposts.

Findings

Particle counts near outposts converge to a multidimensional Heine distribution.

Particle counts are strongly correlated across all outposts, regardless of geometric separation.

The analysis extends the understanding of Coulomb gases with multiple outposts.

Abstract

We study two-dimensional Coulomb gases in the presence of $m\in\mathbb{N}_{>0}$ outposts. An outpost is a connected component of the coincidence set that lies outside the droplet. The case $m=1$ was previously investigated by Ameur, Charlier, and Cronvall. They showed that, as the total number of particles in the Coulomb gas tends to infinity, the number of particles accumulating near the outpost remains of order one and converges in distribution to the Heine distribution. In this work, we extend this analysis to the case of an arbitrary but fixed number $m$ of outposts. We prove that the joint distribution of the numbers of particles near the outposts converges to a multidimensional Heine distribution. Our results reveal a interesting phenomenon: although the outposts are geometrically disconnected, the particle count near each outpost is strongly correlated with the particle counts near all other outposts, not only the nearest ones (provided the outposts are not separated by a component of the droplet).