Title of article
Singular boundary value problems for the Monge–Ampère equation Original Research Article
Author/Authors
Ahmed Mohammed، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
8
From page
457
To page
464
Abstract
Given a strictly convex, smooth, and bounded domain ΩΩ in RnRn we consider solving the Monge–Ampére equation det(D2u)=f(x,−u)det(D2u)=f(x,−u) for solutions in View the MathML sourceC∞(Ω)∩C(Ω¯) with zero boundary value, where the nonlinearity f(x,t)f(x,t) could be singular at t=0t=0. We will show that under some fairly general assumptions on ff the above Dirichlet problem admits a negative convex solution in ΩΩ. Uniqueness of such solutions is then established for a wide class of nonlinearities f(x,t)f(x,t) as a consequence of a comparison principle.
Keywords
Singular boundary value problem , comparison principle , supersolution , Alexandrov–Bakelman–Pucci maximum principle , first eigenvalue , subsolution
Journal title
Nonlinear Analysis Theory, Methods & Applications
Serial Year
2009
Journal title
Nonlinear Analysis Theory, Methods & Applications
Record number
860768
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