Exponential integrability for Riesz potentials of functions in Orlicz classes
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概要
著者
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Shimomura Tetsu
The Division Of Mathematical In Information Sciences Faculty Of Integrated Arts And Sciences Hiroshi
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MIZUTA Yoshihiro
The Division of Mathematical in Information Sciences, Faculty of Integrated Arts and Sciences, Hiros
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Shimomura Tetsu
The Division Of Environmental And Material Sciences Graduate School Of Biosphere Sciences Hiroshima
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Mizuta Yoshihiro
The Division Of Mathematical And Information Sciences Faculty Of Integrated Arts And Sciences Hirosh
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Mizuta Yoshihiro
The Division Of Mathematical In Information Sciences Faculty Of Integrated Arts And Sciences Hiroshi
関連論文
- Exponential integrability for Riesz potentials of functions in Orlicz classes
- An elementary proof of Sobolev embeddings for Riesz potentials of functions in $L^1$ Morrey spaces
- Minimally fine limits at infinity for p-precise functions
- Spherical means and Riesz decomposition for superbiharmonic functions
- Lq-mean limits for Taylor's expansion of Riesz potentials of functions in Orlicz classes
- Tangential limits and removable sets for weighted Sobolev spaces
- Radial growth of $C^2$ functions satisfying Bloch type condition
- Maximal functions for Lebesgue spaces with variable exponent approaching 1
- Removability of sets for sub-polyharmonic functions
- A generalization of Bocher's theorem for polyharmonic functions
- A generalization of the Liouville theorem to polyharmonic functions
- An integral representation and fine limits at infinity for functions whose Laplacians iterated m times are measures