Unavoidable collections of balls for processes with isotropic unimodal Green function

Abstract

Let us suppose that we have a right continuous Markov semigroup on Rd, d 1, such that its potential kernel is given by convolution with a function G0=g(|·|), where g is decreasing, has a mild lower decay property at zero, and a very weak decay property at infinity. This captures not only the Brownian semigroup (classical potential theory) and isotropic α-stable semigroups (Riesz potentials), but also more general isotropic L\'evy processes, where the characteristic function has a certain lower scaling property, and various geometric stable processes. There always exists a corresponding Hunt process. A subset A of Rd is called unavoidable, if the process hits A with probability 1, wherever it starts. It is known that, for any locally finite union of pairwise disjoint balls B(z,rz), z∈ Z, which is unavoidable, Σz∈ Z g(|z|)/g(rz)=∞. The converse is proven assuming, in addition, that, for some >0, |z-z'| |z| (g(|z|)/g(rz))1/d, whenever z,z'∈ Z, z z'. It also holds, if the balls are regularly located, that is, if their centers keep some minimal mutual distance, each ball of a certain size intersects Z, and rz=g(φ(|z|)), where φ is a decreasing function. The results generalize and, exploiting a zero-one law, simplify recent work by A. Mimica and Z. Vondracek.