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-Best Approximation of a γ -Regular Function

-Best Approximation of a γ -Regular Function Abstract In this paper, we construct γ -regular Cl n -minimal function systems in , the generalized Bergman space of Cl n -valued functions in the Sobolev space which are used in the best way to approximate null solutions of the in-homogeneous Dirac operator. http://www.deepdyve.com/assets/images/DeepDyve-Logo-lg.png Journal of Applied Analysis de Gruyter

-Best Approximation of a γ -Regular Function

Journal of Applied Analysis , Volume 13 (2) – Dec 1, 2007

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Publisher
de Gruyter
Copyright
© Heldermann Verlag
ISSN
1425-6908
eISSN
1869-6082
DOI
10.1515/JAA.2007.259
Publisher site
See Article on Publisher Site

Abstract

Abstract In this paper, we construct γ -regular Cl n -minimal function systems in , the generalized Bergman space of Cl n -valued functions in the Sobolev space which are used in the best way to approximate null solutions of the in-homogeneous Dirac operator.

Journal

Journal of Applied Analysisde Gruyter

Published: Dec 1, 2007

Keywords: Clifford analysis; in-homogeneous Dirac operator; elliptic boundary value problems; minimal systems

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