Lp Lq bounds for spherical maximal operators
Abstract
Let f∈ Lp(Rd), d 3, and let At f(x) the average of f over the sphere with radius t centered at x. For a subset E of [1,2] we prove close to sharp Lp Lq estimates for the maximal function t∈ E |At f|. A new feature is the dependence of the results on both the upper Minkowski dimension of E and the Assouad dimension of E. The result can be applied to prove sparse domination bounds for a related global spherical maximal function.
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