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- Title
Local boundedness of solutions to quasilinear elliptic systems.
- Authors
Cupini, Giovanni; Marcellini, Paolo; Mascolo, Elvira
- Abstract
The mathematical analysis to achieve everywhere regularity in the interior of weak solutions to nonlinear elliptic systems usually starts from their local boundedness. Having in mind De Giorgi's counterexamples, some structure conditions must be imposed to treat systems of partial differential equations. On the contrary, in the scalar case of a general elliptic single equation a well established theory of regularity exists. In this paper we propose a unified approach to local boundedness of weak solutions to a class of quasilinear elliptic systems, with a structure condition inspired by Ladyzhenskaya-Ural'tseva's work for linear systems, as well as valid for the general scalar case. Our growth assumptions on the nonlinear quantities involved are new and general enough to include anisotropic systems with sharp exponents and the p, q-growth case.
- Subjects
MATHEMATICAL analysis; ELLIPTIC functions; ELLIPTIC operators; PARTIAL differential equations; QUASILINEARIZATION
- Publication
Manuscripta Mathematica, 2012, Vol 137, Issue 3/4, p287
- ISSN
0025-2611
- Publication type
Article
- DOI
10.1007/s00229-011-0464-7