Multiple positive solutions for semilinear elliptic systems involving subcritical nonlinearities in R-N

Huei-Li Lin

doi:10.1186/1687-2770-2012-118

Multiple positive solutions for semilinear elliptic systems involving subcritical nonlinearities in R-N

Huei-Li Lin

Center for General Education

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

Abstract

In this paper, we investigate the effect of the coefficient f (x) of the subcritical nonlinearity. Under some assumptions, for sufficiently small epsilon, lambda, mu > 0, there are at least k (>= 1) positive solutions of the semilinear elliptic systems {-epsilon(2)Delta(u) over bar+(u) over bar = lambda g(x)vertical bar(u) over bar vertical bar(q-2)(u) over bar + alpha/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha-2)(u) over bar vertical bar(v) over bar vertical bar(beta) in R-N; -epsilon(2)Delta(u) over bar+<(vover bar> = mu h(x)vertical bar(v) over bar vertical bar(q-2)(v) over bar + beta/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha)(u) over bar vertical bar(v) over bar vertical bar(beta-2)(v) over bar in R-N; (u) over bar,(v) over bar is an element of H-1(R-N), where alpha > 1, beta > 1, 2 < q < p = alpha + beta < 2* = 2N/(N - 2) for N >= 3.

Original language	American English
Journal	Boundary Value Problems
DOIs	https://doi.org/10.1186/1687-2770-2012-118
State	Published - 2012

Keywords

semilinear elliptic systems
subcritical exponents
Nehari manifold
CRITICAL SOBOLEV EXPONENTS
CONCENTRATION-COMPACTNESS PRINCIPLE
EQUATIONS
CALCULUS

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10.1186/1687-2770-2012-118

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@article{3c6a723a86094665be97a09d81652052,

title = "Multiple positive solutions for semilinear elliptic systems involving subcritical nonlinearities in R-N",

abstract = "In this paper, we investigate the effect of the coefficient f (x) of the subcritical nonlinearity. Under some assumptions, for sufficiently small epsilon, lambda, mu > 0, there are at least k (>= 1) positive solutions of the semilinear elliptic systems \{-epsilon(2)Delta(u) over bar+(u) over bar = lambda g(x)vertical bar(u) over bar vertical bar(q-2)(u) over bar + alpha/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha-2)(u) over bar vertical bar(v) over bar vertical bar(beta) in R-N; -epsilon(2)Delta(u) over bar+<(vover bar> = mu h(x)vertical bar(v) over bar vertical bar(q-2)(v) over bar + beta/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha)(u) over bar vertical bar(v) over bar vertical bar(beta-2)(v) over bar in R-N; (u) over bar,(v) over bar is an element of H-1(R-N), where alpha > 1, beta > 1, 2 < q < p = alpha + beta < 2* = 2N/(N - 2) for N >= 3.",

keywords = "semilinear elliptic systems, subcritical exponents, Nehari manifold, CRITICAL SOBOLEV EXPONENTS, CONCENTRATION-COMPACTNESS PRINCIPLE, EQUATIONS, CALCULUS",

author = "Huei-Li Lin",

year = "2012",

doi = "10.1186/1687-2770-2012-118",

language = "American English",

journal = "Boundary Value Problems",

issn = "1687-2762",

publisher = "SpringerOpen",

}

TY - JOUR

T1 - Multiple positive solutions for semilinear elliptic systems involving subcritical nonlinearities in R-N

AU - Lin, Huei-Li

PY - 2012

Y1 - 2012

N2 - In this paper, we investigate the effect of the coefficient f (x) of the subcritical nonlinearity. Under some assumptions, for sufficiently small epsilon, lambda, mu > 0, there are at least k (>= 1) positive solutions of the semilinear elliptic systems {-epsilon(2)Delta(u) over bar+(u) over bar = lambda g(x)vertical bar(u) over bar vertical bar(q-2)(u) over bar + alpha/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha-2)(u) over bar vertical bar(v) over bar vertical bar(beta) in R-N; -epsilon(2)Delta(u) over bar+<(vover bar> = mu h(x)vertical bar(v) over bar vertical bar(q-2)(v) over bar + beta/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha)(u) over bar vertical bar(v) over bar vertical bar(beta-2)(v) over bar in R-N; (u) over bar,(v) over bar is an element of H-1(R-N), where alpha > 1, beta > 1, 2 < q < p = alpha + beta < 2* = 2N/(N - 2) for N >= 3.

AB - In this paper, we investigate the effect of the coefficient f (x) of the subcritical nonlinearity. Under some assumptions, for sufficiently small epsilon, lambda, mu > 0, there are at least k (>= 1) positive solutions of the semilinear elliptic systems {-epsilon(2)Delta(u) over bar+(u) over bar = lambda g(x)vertical bar(u) over bar vertical bar(q-2)(u) over bar + alpha/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha-2)(u) over bar vertical bar(v) over bar vertical bar(beta) in R-N; -epsilon(2)Delta(u) over bar+<(vover bar> = mu h(x)vertical bar(v) over bar vertical bar(q-2)(v) over bar + beta/alpha+beta f(x)vertical bar(u) over bar vertical bar(alpha)(u) over bar vertical bar(v) over bar vertical bar(beta-2)(v) over bar in R-N; (u) over bar,(v) over bar is an element of H-1(R-N), where alpha > 1, beta > 1, 2 < q < p = alpha + beta < 2* = 2N/(N - 2) for N >= 3.

KW - semilinear elliptic systems

KW - subcritical exponents

KW - Nehari manifold

KW - CRITICAL SOBOLEV EXPONENTS

KW - CONCENTRATION-COMPACTNESS PRINCIPLE

KW - EQUATIONS

KW - CALCULUS

U2 - 10.1186/1687-2770-2012-118

DO - 10.1186/1687-2770-2012-118

M3 - Journal Article

SN - 1687-2762

JO - Boundary Value Problems

JF - Boundary Value Problems

ER -

Multiple positive solutions for semilinear elliptic systems involving subcritical nonlinearities in R-N

Abstract

Keywords

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