Hitting Probabilities and the Ekstr\"om-Persson conjecture

Abstract

We consider the Ekst\''om-Persson conjecture concerning the value of the Hausdorff dimension of random covering sets formed by balls with radii (k-α)k=1∞ and centres chosen independently at random according to an arbitrary Borel probability measure μ on Rd. The conjecture has been solved positively in the case 1α H μ, where H μ stands for the upper Hausdorff dimension of μ. In this paper, we develop a new approach in order to answer the full conjecture, proving in particular that the conjectured value is only a lower bound for the dimension. Our approach opens the way to study more general limsup sets, and has consequences on the so-called hitting probability questions. For instance, we are able to determine whether and what part of a deterministic analytic set can be hit by random covering sets formed by open sets.