Asymptotics of the critical time in Wiener sausage percolation with a small radius

Abstract

We consider a continuum percolation model on d, where d≥ 4.The occupied set is given by the union of independent Wiener sausages with radius r running up to time t and whoseinitial points are distributed according to a homogeneous Poisson point process.It was established in a previous work by Erhard, Mart\'inez and Poisat~EMP13 that (1) if r is small enough there is a non-trivial percolation transitionin t occuring at a critical time t\c(r) and (2) in the supercritical regime the unbounded cluster is unique. In this paper we investigate the asymptotic behaviour of the critical time when the radius r converges to 0. The latter does not seem to be deducible from simple scaling arguments. We prove that for d≥ 4, there is a positive constant c such thatc-1(1/r)≤ t\c(r)≤ c(1/r) when d=4 and c-1r(4-d)/2≤ t\c(r) ≤ c\ r(4-d)/2 when d≥ 5, as r converges to 0. We derive along the way moment estimates on the capacity of Wiener sausages, which may be of independent interest.