Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent

Futoshi Takahashi

doi:10.1515/ans-2008-0408

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Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent

Futoshi Takahashi

Published/Copyright: March 10, 2016

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From the journal Advanced Nonlinear Studies Volume 8 Issue 4

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APA
Harvard
Chicago
Vancouver

Takahashi, Futoshi. "Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent" Advanced Nonlinear Studies, vol. 8, no. 4, 2008, pp. 783-797. https://doi.org/10.1515/ans-2008-0408

Takahashi, F. (2008). Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent. Advanced Nonlinear Studies, 8(4), 783-797. https://doi.org/10.1515/ans-2008-0408

Takahashi, F. (2008) Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent. Advanced Nonlinear Studies, Vol. 8 (Issue 4), pp. 783-797. https://doi.org/10.1515/ans-2008-0408

Takahashi, Futoshi. "Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent" Advanced Nonlinear Studies 8, no. 4 (2008): 783-797. https://doi.org/10.1515/ans-2008-0408

Takahashi F. Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent. Advanced Nonlinear Studies. 2008;8(4): 783-797. https://doi.org/10.1515/ans-2008-0408

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Published Online: 2016-03-10

Published in Print: 2008-11-01

Articles in the same Issue

Sobolev Inequalities and Ellipticity of Planar Linear Hamiltonian Systems
A Nonresonance Condition for Boundary Value Problems
Compactness Property of a Singular Quasilinear Elliptic Equation
Absence of Global Solutions to Systems of Perturbed Parabolic Inequalities with Chipot–Weissler Nonlinearity in the Gradient Term
Weak Solutions of the Problem ∆²u = u^n/n-4 with Prescribed Singular Sets
Exponential Growth Rates of Periodic Asymmetric Oscillators
Positive Solutions of a System Arising from Angiogenesis
Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent
The Multidimensional Bipolar Quantum Drift-diffusion Model
Vortices with Prescribed L² Norm in the Nonlinear Wave Equation
Existence and Multiplicity of Solutions for Neumann p-Laplacian-Type Equations
On the Global Analytic Integrability of the Belousov–Zhabotinskii System

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https://doi.org/10.1515/ans-2008-0408

Keywords for this article

nondegeneracy; critical exponent; least energy solution

Articles in the same Issue

Sobolev Inequalities and Ellipticity of Planar Linear Hamiltonian Systems
A Nonresonance Condition for Boundary Value Problems
Compactness Property of a Singular Quasilinear Elliptic Equation
Absence of Global Solutions to Systems of Perturbed Parabolic Inequalities with Chipot–Weissler Nonlinearity in the Gradient Term
Weak Solutions of the Problem ∆²u = u^n/n-4 with Prescribed Singular Sets
Exponential Growth Rates of Periodic Asymmetric Oscillators
Positive Solutions of a System Arising from Angiogenesis
Asymptotic Nondegeneracy of Least Energy Solutions to an Elliptic Problem with Critical Sobolev Exponent
The Multidimensional Bipolar Quantum Drift-diffusion Model
Vortices with Prescribed L² Norm in the Nonlinear Wave Equation
Existence and Multiplicity of Solutions for Neumann p-Laplacian-Type Equations
On the Global Analytic Integrability of the Belousov–Zhabotinskii System