Hardy-Littlewood and Caccioppoli-type inequalities for \(A\)-harmonic tensors
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Publication:978424
DOI10.1155/2010/351597zbMath1194.26038OpenAlexW2053762203WikidataQ59254790 ScholiaQ59254790MaRDI QIDQ978424
Publication date: 24 June 2010
Published in: Journal of Inequalities and Applications (Search for Journal in Brave)
Full work available at URL: https://eudml.org/doc/233251
Cites Work
- Lipschitz and BMO norm inequalities for operators
- A singular integral of the composite operator
- Weighted Poincaré-type inequalities for differential forms in \(L^s(\mu)\)-averaging domains
- Some examples of conjugate \(P\)-harmonic differential forms
- Global Poincaré inequalities for Green's operator applied to the solutions of the nonhomogeneous \(A\)-harmonic equation
- \(A_{r}^{\lambda}(\Omega)\)-weighted imbedding inequalities for \(A\)-harmonic tensors.
- Weighted Poincaré-type estimates for conjugate \(A\)-harmonic tensors
- Local and global norm comparison theorems for solutions to the nonhomogeneous A-harmonic equation
- Inequalities for Differential Forms
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