On the hitting probabilities of limsup random fractals

Abstract

Let A be a limsup random fractal with indices γ1, ~γ2 ~and δ on [0,1]d. We determine the hitting probability P(A G) for any analytic set G with the condition () H(G)>γ2+δ, where H denotes the Hausdorff dimension. This extends the correspondence of Khoshnevisan, Peres and Xiao [10] by relaxing the condition that the probability Pn of choosing each dyadic hyper-cube is homogeneous and n∞2Pnn exists. We also present some counterexamples to show the Hausdorff dimension in condition () can not be replaced by the packing dimension.

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