Nonlinear problems with boundary blow-up: A Karamata regular variation theory approach

Florica Corina Cîrstea; Vicenţiu Rǎdulescu

Nonlinear problems with boundary blow-up: A Karamata regular variation theory approach

Florica Corina Cîrstea^*, Vicenţiu Rǎdulescu

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

100 Citations (Scopus)

Abstract

We study the uniqueness and expansion properties of the positive solution of the logistic equation Δu+au=b(x)f(u) in a smooth bounded domain Ω, subject to the singular boundary condition u=+∞ on. The absorption term f is a positive function satisfying the Keller-Osserman condition and such that the mapping f(u)/u is increasing on (0,+∞). We assume that b is non-negative, while the values of the real parameter a are related to an appropriate semilinear eigenvalue problem. Our analysis is based on the Karamata regular variation theory.

Original language	English
Pages (from-to)	275-298
Number of pages	24
Journal	Asymptotic Analysis
Volume	46
Issue number	3-4
Publication status	Published - 2006

Cite this

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title = "Nonlinear problems with boundary blow-up: A Karamata regular variation theory approach",

abstract = "We study the uniqueness and expansion properties of the positive solution of the logistic equation Δu+au=b(x)f(u) in a smooth bounded domain Ω, subject to the singular boundary condition u=+∞ on. The absorption term f is a positive function satisfying the Keller-Osserman condition and such that the mapping f(u)/u is increasing on (0,+∞). We assume that b is non-negative, while the values of the real parameter a are related to an appropriate semilinear eigenvalue problem. Our analysis is based on the Karamata regular variation theory.",

author = "C{\^i}rstea, {Florica Corina} and Vicen{\c t}iu Rǎdulescu",

year = "2006",

language = "English",

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journal = "Asymptotic Analysis",

issn = "0921-7134",

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T2 - A Karamata regular variation theory approach

AU - Cîrstea, Florica Corina

AU - Rǎdulescu, Vicenţiu

PY - 2006

Y1 - 2006

N2 - We study the uniqueness and expansion properties of the positive solution of the logistic equation Δu+au=b(x)f(u) in a smooth bounded domain Ω, subject to the singular boundary condition u=+∞ on. The absorption term f is a positive function satisfying the Keller-Osserman condition and such that the mapping f(u)/u is increasing on (0,+∞). We assume that b is non-negative, while the values of the real parameter a are related to an appropriate semilinear eigenvalue problem. Our analysis is based on the Karamata regular variation theory.

AB - We study the uniqueness and expansion properties of the positive solution of the logistic equation Δu+au=b(x)f(u) in a smooth bounded domain Ω, subject to the singular boundary condition u=+∞ on. The absorption term f is a positive function satisfying the Keller-Osserman condition and such that the mapping f(u)/u is increasing on (0,+∞). We assume that b is non-negative, while the values of the real parameter a are related to an appropriate semilinear eigenvalue problem. Our analysis is based on the Karamata regular variation theory.

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M3 - Article

SN - 0921-7134

VL - 46

SP - 275

EP - 298

JO - Asymptotic Analysis

JF - Asymptotic Analysis

IS - 3-4

ER -

Nonlinear problems with boundary blow-up: A Karamata regular variation theory approach

Abstract

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