Dimensions of random covering sets in Riemann manifolds

Abstract

Let M, N and K be d-dimensional Riemann manifolds. Assume that A:=(An)n∈ N is a sequence of Lebesgue measurable subsets of M satisfying a necessary density condition and x:=(xn)n∈ N is a sequence of independent random variables which are distributed on K according to a measure which is not purely singular with respect to the Riemann volume. We give a formula for the almost sure value of the Hausdorff dimension of random covering sets E( x, A):=n∞An(xn)⊂ N. Here An(xn) is a diffeomorphic image of An depending on xn. We also verify that the packing dimensions of E( x, A) equal d almost surely.