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Superlinear elliptic equation for fully nonlinear operators without growth restrictions for the data

Published online by Cambridge University Press:  12 January 2010

Maria J. Esteban
Affiliation:
Ceremade UMR CNRS 7534, Université Paris Dauphine, 75775 Paris Cedex 16, France, Email: ([email protected])
Patricio L. Felmer
Affiliation:
Departamento de Ingeniería Matemática and Centro de Modelamiento Matemático, UMR2071 CNRS-U Chile, Universidad de Chile, Casilla 170 Correo 3, Santiago, Chile
Alexander Quaas
Affiliation:
Departamento de Matemática, Universidad Técnica Federico Santa María, Casilla V-110, Avenida España 1680, Valparaíso, Chile
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Abstract

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We deal with existence and uniqueness of the solution to the fully nonlinear equation

F(D2u) + |u|s−1u = f(x) in ℝn,

where s > 1 and f satisfies only local integrability conditions. This result is well known when, instead of the fully nonlinear elliptic operator F, the Laplacian or a divergence-form operator is considered. Our existence results use the Alexandroff-Bakelman-Pucci inequality since we cannot use any variational formulation. For radially symmetric f, and in the particular case where F is a maximal Pucci operator, we can prove our results under fewer integrability assumptions, taking advantage of an appropriate variational formulation. We also obtain an existence result with boundary blow-up in smooth domains.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2010