# Bounded extremal and Cauchy--Laplace problems on the sphere and shell

Abstract : In this work, we develop a theory of approximating general vector fields on subsets of the sphere in $\RR^n$ by harmonic gradients from the Hardy space $H^p$ of the ball, \$1
Document type :
Reports

Cited literature [29 references]

https://hal.inria.fr/inria-00272203
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Submitted on : Monday, April 14, 2008 - 2:44:35 PM
Last modification on : Thursday, February 7, 2019 - 2:24:38 PM
Long-term archiving on: : Friday, November 25, 2016 - 10:00:46 PM

### Files

RR-6504.pdf
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### Identifiers

• HAL Id : inria-00272203, version 2

### Citation

Bilal Atfeh, Laurent Baratchart, Juliette Leblond, Jonathan R. Partington. Bounded extremal and Cauchy--Laplace problems on the sphere and shell. [Research Report] RR-6504, INRIA. 2008. ⟨inria-00272203v2⟩

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