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Gradient estimates for the p (x)-Laplacean system
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Emilio Acerbi
Published/Copyright:
November 7, 2005
Abstract
We prove Calderón and Zygmund type estimates for a class of elliptic problems whose model is the non-homogeneous p (x )-Laplacean system
Under optimal continuity assumptions on the function p (x ) > 1 we prove that
Our estimates are motivated by recent developments in non-Newtonian fluidmechanics and elliptic problems with non-standard growth conditions, and are the natural, ‘‘non-linear’’ counterpart of those obtained by Diening and Růžička [L. Diening and M. Růžička, Calderón-Zygmund operators on generalized Lebesgue spaces Lp(‧) and problems related to fluid dynamics, J. reine angew. Math. 563 (2003), 197–220] in the linear case.
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Published Online: 2005-11-07
Published in Print: 2005-07-26
© Walter de Gruyter
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Articles in the same Issue
- An exact mass formula for quadratic forms over number fields
- Exponential sums and congruences with factorials
- Fourier-Mukai transforms and semi-stable sheaves on nodal Weierstraß cubics
- Counting rational points on hypersurfaces
- Gradient estimates for the p (x)-Laplacean system
- Gorenstein liaison and ACM sheaves
- Geometry of chains of minimal rational curves
- Entropy geometry and disjointness for zero-dimensional algebraic actions
- Non-linearizable CR-automorphisms, torsion-free elliptic CR-manifolds and second order ODE
