On the capacity functional of the infinite cluster of a Boolean model

Abstract

The original 2017 version of this paper, published in Ann. Appl. Probab., 27, 1678--1801, contains a major gap in the proofs. In the subsequent publication in Ann. Appl. Probab., 34, 3370--3374, 2024, we indicated how to fix this. For convenience of the reader, we here update the original paper to incorporate the suggested fix. Consider a Boolean model in Rd with balls of random, bounded radii with distribution F0, centered at the points of a Poisson process of intensity t>0. The capacity functional of the infinite cluster Z∞ is given by θL(t) = P(Z∞ L ≠ ), defined for each compact L⊂ Rd. We prove for any fixed L and F0 that θL(t) is infinitely differentiable in t, except at the critical value tc; we give a Margulis-Russo type formula for the derivatives. More generally, allowing the distribution F0 to vary and viewing θL as a function of the measure F:=tF0, we show that it is infinitely differentiable in all directions with respect to the measure F in the supercritical region of the cone of positive measures on a bounded interval. We also prove that θL(·) grows at least linearly at the critical value. This implies that the critical exponent known as β is at most 1 (if it exists) for this model. Along the way, we extend a result of H.Tanemura (1993), on regularity of the supercritical Boolean model in d ≥ 3 with fixed-radius balls, to the case with bounded random radii.