Number-Rigidity and β-Circular Riesz gas

Abstract

For an inverse temperature β>0, we define the β-circular Riesz gas on Rd as any microscopic thermodynamic limit of Gibbs particle systems on the torus interacting via the Riesz potential g(x) = x -s. We focus on the non integrable case d-1<s<d. Our main result ensures, for any dimension d 1 and inverse temperature β>0, the existence of a β-circular Riesz gas which is not number-rigid. Recall that a point process is said number rigid if the number of points in a bounded Borel set is a function of the point configuration outside . It is the first time that the non number-rigidity is proved for a Gibbs point process interacting via a non integrable potential. We follow a statistical physics approach based on the canonical DLR equations. It is inspired by Dereudre-Hardy-Lebl\'e and Ma\"ida (2021) where the authors prove the number-rigidity of the Sineβ process.