Boundary blow-up in nonlinear elliptic equations of Bieberbach--Rademacher type
Date
2007-02-13
Authors
Cîrstea, Florica-Corina
Rădulescu, Vicenţiu
Journal Title
Journal ISSN
Volume Title
Publisher
American Mathematical Society
Abstract
We establish the uniqueness of the positive solution for equations
of the form −∆u = au − b(x)f(u) in Ω, u|∂Ω = ∞. The special feature is
to consider nonlinearities f whose variation at infinity is not regular (e.g.,
exp(u) − 1, sinh(u), cosh(u) − 1, exp(u) log(u + 1), uᵝ exp(uᵞ), β ∈ R, γ > 0
or exp(exp(u)) − e) and functions b ≥ 0 in Ω vanishing on ∂Ω. The main
innovation consists of using Karamata’s theory not only in the statement/proof
of the main result but also to link the nonregular variation of f at infinity with
the blow-up rate of the solution near ∂Ω.
Description
Keywords
Large solutions, boundary blow-up, regular variation theory
Citation
Collections
Source
Transactions of the American Mathematical Society
Type
Journal article