Carlos Pérez, Tiago Picon, Olli Saari, Mateus Sousa
Published 2017-11-04Version 1
We prove that maximal operators of convolution type associated to smooth kernels are bounded in the homogeneous Hardy-Sobolev spaces $\dot{H}^{1,p}(\mathbb{R}^d)$ 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 $\dot{h}^{1,p}(\mathbb{R}^d)$ in the same range of exponents.
On the continuity of maximal operators of convolution type at the derivative level
On the regularity of maximal operators
Maximal functions associated with Fourier multipliers of Mikhlin-H"ormander type
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