Random Covering Sets in Metric Space with Exponentially Mixing Property

Abstract

Let \B(n,rn)\n1 be a sequence of random balls whose centers \n\n1 is a stationary process, and \rn\n1 is a sequence of positive numbers decreasing to 0. Our object is the random covering set E=n∞B(n,rn), that is, the points covered by B(n,rn) infinitely often. The sizes of E are investigated from the viewpoint of measure, dimension and topology.