Mean-field bounds for Poisson-Boolean percolation

Abstract

We establish the mean-field bounds γ 1, δ 2 and 2 on the critical exponents of the Poisson-Boolean continuum percolation model under a moment condition on the radii; these were previously known only in the special case of fixed radii (in the case of γ), or not at all (in the case of δ and ). We deduce these as consequences of the mean-field bound β 1, recently established by Duminil-Copin, Raoufi and Tassion under the same moment condition, using a relative entropy method introduced by the authors in previous work.