On logarithmic bounds of maximal sparse operators

Abstract

Given sparse collections of measurable sets Sk, k=1,2,… ,N, in a general measure space (X, M,μ), let Sk be the sparse operator, corresponding to Sk. We show that the maximal sparse function f = 1 k N Sk f satisfies align* &\| \| Lp(X) Lp,∞(X) N· \|M S\|Lp(X) Lp,∞(X),\,1 p<∞, \\ & Lp(X) Lp(X) ( N)\1,1/(p-1)\· \|M S\|Lp(X) Lp(X),\, 1<p<∞, align* where M S is the maximal function corresponding to the collection of sets S=k Sk. As a consequence, one can derive norm bounds for maximal functions formed from taking measurable selections of one-dimensional Calder\'on-Zygmund operators in the plane. Prior results of this type had a fixed choice of Calder\'on-Zygmund operator for each direction.