On inequalities of Hardy-Sobolev type.

Balinsky, A.; Evans, W.D.; Hundertmark, D; Lewis, R.T.

Displaying similar documents to “On inequalities of Hardy-Sobolev type.”

On the structure of Hardy–Sobolev–Maz'ya inequalities

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Some integral inequalities of Hardy type

B. Florkiewicz (1980)

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Refined Hardy inequalities

Hajer Bahouri, Jean-Yves Chemin, Isabelle Gallagher (2006)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

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The aim of this article is to present “refined” Hardy-type inequalities. Those inequalities are generalisations of the usual Hardy inequalities, their additional feature being that they are invariant under oscillations: when applied to highly oscillatory functions, both sides of the refined inequality are of the same order of magnitude. The proof relies on paradifferential calculus and Besov spaces. It is also adapted to the case of the Heisenberg group.

Refined multidimensional Hardy-type inequalities via superquadracity.

Oguntuase, J.A., Persson, L.-E., Essel, E.K., Popoola, B.A. (2008)

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Duality and best constant for a Trudinger–Moser inequality involving probability measures

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Hardy-Poincaré type inequalities derived from p-harmonic problems

Iwona Skrzypczak (2014)

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We apply general Hardy type inequalities, recently obtained by the author. As a consequence we obtain a family of Hardy-Poincaré inequalities with certain constants, contributing to the question about precise constants in such inequalities posed in [3]. We confirm optimality of some constants obtained in [3] and [8]. Furthermore, we give constants for generalized inequalities with the proof of their optimality.

A study of some constants characterizing the weighted Hardy inequality

Alois Kufner, Lars-Erik Persson, Anna Wedestig (2004)

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Integral inequalities related to Hardy's inequality.

R.N. Mohapatra, D.C. Russel (1985)

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Atomic decomposition on Hardy-Sobolev spaces

Yong-Kum Cho, Joonil Kim (2006)

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As a natural extension of $L^{p}$ Sobolev spaces, we consider Hardy-Sobolev spaces and establish an atomic decomposition theorem, analogous to the atomic decomposition characterization of Hardy spaces. As an application, we deduce several embedding results for Hardy-Sobolev spaces.

Higher order Hardy inequalities.

Alois Kufner (1993)

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Strichartz's conjecture on Hardy-Sobolev spaces

Yong-Kum Cho (2005)

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We prove Strichartz's conjecture regarding a characterization of Hardy-Sobolev spaces.

Integral inequalities with weights for the Hardy maximal function

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Some weighted Hardy-type inequalities on anisotropic Heisenberg groups.

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On a Variant of the Gagliardo-Nirenberg Inequality Deduced from the Hardy Inequality

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Bulletin of the Polish Academy of Sciences. Mathematics

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We obtain new variants of weighted Gagliardo-Nirenberg interpolation inequalities in Orlicz spaces, as a consequence of weighted Hardy-type inequalities. The weights we consider need not be doubling.