On genericity of non-uniform Dvoretzky coverings of the circle

Abstract

The classical Dvoretzky covering problem asks for conditions on the sequence of lengths \n\n∈ N so that the random intervals In : = (ωn -(n/2), ωn +(n/2)) where ωn is a sequence of i.i.d. uniformly distributed random variable, covers any point on the circle T infinitely often. We consider the case when ωn are absolutely continuous with a density function f. When mf=essinfTf>0 and the set Kf of its essential infimum points satisfies B Kf<1, where B is the upper box-counting dimension, we show that the following condition is necessary and sufficient for T to be μf-Dvoretzky covered \[ n → ∞ (1 + … + n n)≥ 1mf. \] Under more restrictive assumptions on \n\ the above result is true if H Kf<1. We next show that as long as \n\n∈ N and f satisfy the above condition and |Kf|=0, then a Menshov type result holds, i.e. Dvoretzky covering can be achieved by changing f on a set of arbitrarily small Lebesgue measure. This, however, is not true for the uniform density.

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