Nikodym sets and maximal functions associated with spheres
Abstract
We study spherical analogues of Nikodym sets and related maximal functions. In particular, we prove sharp Lp-estimates for Nikodym maximal functions associated with spheres. As a corollary, any Nikodym set for spheres must have full Hausdorff dimension. In addition, we consider a class of maximal functions which contains the spherical maximal function as a special case. We show that Lp-estimates for these maximal functions can be deduced from local smoothing estimates for the wave equation relative to fractal measures.
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