Choquet integrals, Hausdorff content and sparse operators
Abstract
Let Hd, 0<d<n, be the dyadic Hausdorff content of the n-dimensional Euclidean space Rn. It is shown that Hd counts a~Cantor set of the unit cube [0, 1)n as ≈ 1, which implies unboundedness of the sparse operator A S on the Choquet space Lp(Hd), p>0. In this paper we verify that the sparse operator A S maps Lp(Hd), 1 p<∞, into an associate space of Orlicz-Morrey space Mp'_0(Hd)', 0(t)=t(e+t). We also give another characterizations of those associate spaces using the tiling T of Rn.
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