Hyperuniform and rigid stable matchings

Abstract

We study a stable partial matching τ of the (possibly randomized) d-dimensional lattice with a stationary determinantal point process on Rd with intensity α>1. For instance, might be a Poisson process. The matched points from form a stationary and ergodic (under lattice shifts) point process τ with intensity 1 that very much resembles for α close to 1. On the other hand τ is hyperuniform and number rigid, quite in contrast to a Poisson process. We deduce these properties by proving more general results for a stationary point process , whose so-called matching flower (a stopping set determining the matching partner of a lattice point) has a certain subexponential tail behaviour. For hyperuniformity, we also additionally need to assume some mixing condition on . Further, if is a Poisson process then τ has an exponentially decreasing truncated pair correlation function.