Percolation for the stable marriage of Poisson and Lebesgue with random appetites

Abstract

Let be a set of centers chosen according to a Poisson point process in Rd. Consider the allocation of Rd to which is stable in the sense of the Gale-Shapley marriage problem, with the additional feature that every center ∈ has a random appetite α V, where α is a nonnegative scale constant and V is a nonnegative random variable. Generalizing previous results by Freire, Popov and Vachkovskaia (FPV), we show the absence of percolation when α is small enough, depending on certain characteristics of the moment of V.