We consider the functional J(v) = integral Omega [f(vertical bar del v vertical bar) - v]dx, where Omega is a bounded domain and f : [0,+ infinity) -> R is a convex function vanishing for s is an element of [0, sigma], with sigma > 0. We prove that a minimizer u of J satisfies an equation of the form min(F(del u, D(2)u), vertical bar del u vertical bar - sigma) = 0 in the viscosity sense.
A viscosity equation for minimizers of a class of very degenerate elliptic functionals / G. Ciraolo (SPRINGER INDAM SERIES). - In: Geometric Properties for Parabolic and Elliptic PDE's / [a cura di] R. Magnanini, S. Sakaguchi, A. Alvino. - [s.l] : Springer, 2013. - ISBN 9788847028401. - pp. 67-83 [10.1007/978-88-470-2841-8_5]
A viscosity equation for minimizers of a class of very degenerate elliptic functionals
G. Ciraolo
2013
Abstract
We consider the functional J(v) = integral Omega [f(vertical bar del v vertical bar) - v]dx, where Omega is a bounded domain and f : [0,+ infinity) -> R is a convex function vanishing for s is an element of [0, sigma], with sigma > 0. We prove that a minimizer u of J satisfies an equation of the form min(F(del u, D(2)u), vertical bar del u vertical bar - sigma) = 0 in the viscosity sense.
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8 - Ciraolo_IV_ViscEq.pdf
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