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Boundary value problem with an oblique derivative for uniformly elliptic operators with discontinuous coefficients
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Antonino Maugeri
Published/Copyright:
March 2, 2009
Abstract
Strong solvability is proved in the Sobolev space W2,p(Ω), 1 < p < ∞, for the regular oblique derivative problem
assuming 
.
Received: 1996-07-20
Revised: 1997-01-10
Published Online: 2009-03-02
Published in Print: 1998-07-10
© Walter de Gruyter
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Articles in the same Issue
- Boundary value problem with an oblique derivative for uniformly elliptic operators with discontinuous coefficients
- Radon transforms on the symmetric group and harmonic analysis of a class of invariant Laplacians
- Linear submanifolds and bisectors in ℂHn
- Affine Hughes groups acting on 4-dimensional compact projective planes
- A parallelism for contact conformal sub-Riemannian geometry
- Finite groups with smooth one fixed point actions on spheres
