Overdetermined problems for p-Laplace and generalized Monge–Ampére equations

We investigate overdetermined problems for p-Laplace and generalized Monge-Amp´ere equations. By using the theory of domain derivative we find duality results and a characterization of the overdetermined boundary conditions via minimization of suitable functionals with respect to the domain.

Bibliographic Details
Main Authors:	Emamizadeh, Behrouz, Liu, Yichen, Porru, Giovanni
Format:	Article
Language:	English
Published:	2020
Subjects:	Overdetermined problems; Domain derivative; Duality results; Do- main functionals; p-Laplace equations; Generalized Monge-Amp�ere equations.
Online Access:	https://eprints.nottingham.ac.uk/64163/

Description
Summary:	We investigate overdetermined problems for p-Laplace and generalized Monge-Amp´ere equations. By using the theory of domain derivative we find duality results and a characterization of the overdetermined boundary conditions via minimization of suitable functionals with respect to the domain.

Overdetermined problems for p-Laplace and generalized Monge–Ampére equations

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