Quasi-elliptic and weakly coercive systems in Sobolev spaces of vector functions
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Publication:1033781
DOI10.1134/S106192080802009XzbMath1176.35051MaRDI QIDQ1033781
D. V. Limanskii, Mark M. Malamud
Publication date: 10 November 2009
Published in: Russian Journal of Mathematical Physics (Search for Journal in Brave)
Related Items
The question on multipliers in \(L^1\) and \(C\), On determining the domain of the adjoint operator, On estimates for the tensor product of two homogeneous elliptic operators
Cites Work
- On the theory of general partial differential operators
- A non-inequality for differential operators in the \(L_ 1\) norm
- Multipliers in \(L_1\) and estimates for systems of differential operators
- Weakly coercive non-quasi-elliptic systems of differential operators in \(W _{l}^{p} (\mathbb R^{n})\)
- A priori estimates for differential operators in \(L_ \infty\) norm
- Supremum norm estimates for partial derivatives of functions of several real variables
- Interior estimates for elliptic systems of partial differential equations
- The non-existence of $L^{p}$-estimates for certain translation-invariant operators
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