Subcritical sharpness for multiscale Boolean percolation

Abstract

We consider a multiscale Boolean percolation on Rd with radius distribution μ on [1,+∞), d 2. The model is defined by superposing the original Boolean percolation model with radius distribution μ with a countable number of scaled independent copies. The n-th copy is a Boolean percolation with radius distribution μ|[1,] rescaled by n. We prove that under some regularity assumption on μ, the subcritical phase of the multiscale model is sharp for large enough. Moreover, we prove that the existence of an unbounded connected component depends only on the fractal part (and not of the balls with radius larger than 1).