Regularity of maximal functions on Hardy-Sobolev spaces
Abstract
We prove that maximal operators of convolution type associated to smooth kernels are bounded in the homogeneous Hardy-Sobolev spaces H1,p(Rd) when 1/p < 1+1/d. This range of exponents is sharp. As a by-product of the proof, we obtain similar results for the local Hardy-Sobolev spaces h1,p(Rd) in the same range of exponents.
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