The centered maximal operator removes the non-concave Cantor part from the gradient

Abstract

We study regularity of the centered Hardy--Littlewood maximal function M f of a function f of bounded variation in Rd, d∈ N. In particular, we show that at |Dc f|-a.e. point x where f has a non-concave blow-up, it holds that M f(x)>f*(x). We further deduce from this that if the variation measure of f has no jump part and its Cantor part has non-concave blow-ups, then BV regularity of M f can be upgraded to Sobolev regularity.

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