A note on the hitting probabilities of random covering sets
Abstract
Let E=n∞(gn+n) be the random covering set on the torus Td, where \gn\ is a sequence of ball-like sets and n is a sequence of independent random variables uniformly distributed on d. We prove that E F≠ almost surely whenever F⊂Td is an analytic set with Hausdorff dimension, H(F)>d-α, where α is the almost sure Hausdorff dimension of E. Moreover, examples are given to show that the condition on H(F) cannot be replaced by the packing dimension of F.
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