Sharp higher order regularity of discrete maximal functions
Abstract
We derive sharp p(Z) bounds for the kth derivative of the discrete uncentered maximal operator applied to characteristic functions f:Z\0,1\ in the cases k=0,1,2. When k=1,2 these are the first sharp bounds for derivatives of a Hardy-Littlewood maximal function in continuous or discrete settings when 1<p<∞. We also establish several lower bounds for k≥ 3 and for general functions f:Z.
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