Excess deviations for points disconnected by random interlacements

Abstract

We consider random interlacements on Zd, d 3, when their vacant set is in a strongly percolative regime. Given a large box centered at the origin, we establish an asymptotic upper bound on the exponential rate of decay of the probability that the box contains an excessive fraction of points that are disconnected by random interlacements from the boundary of a concentric box of double size. As an application we show that when is not too large, this asymptotic upper bound matches the asymptotic lower bound derived in a previous work of the author, and the exponential rate of decay is governed by a certain variational problem in the continuum which involves the percolation function of the vacant set of random interlacements.