Nodal solutions of nonlinear elliptic Dirichlet problems on radial domains

Thomas Bartsch; Marco Degiovanni

doi:10.4171/RLM/454

Nodal solutions of nonlinear elliptic Dirichlet problems on radial domains

Thomas Bartsch
, Marco Degiovanni

Faculty of Mathematical, Physical and Natural Sciences

Justus Liebig University Giessen

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

10 Citations (Scopus)

Abstract

Let Omega be a ball or an annulus in R^N and f absolutely continuous, superlinear, subcritical, and such that f(0)=0. We prove that the least energy nodal solution of -Delta u= f(u) is not radial. We also\r\nprove that Fucik eigenfunctions on the first nontrivial curve of the Fucik spectrum, are not radial. A related result holds for asymmetric weighted eigenvalue problems. An essential ingredient is a quadratic form generalizing the Hessian of the energy functional J at a solution. We give new estimates on the Morse index of this form at a radial solution. These estimates are of independent interest.

Original language	English
Pages (from-to)	69-85
Number of pages	17
Journal	ATTI DELLA ACCADEMIA NAZIONALE DEI LINCEI. RENDICONTI LINCEI. MATEMATICA E APPLICAZIONI
Volume	17
Issue number	1
DOIs	https://doi.org/10.4171/RLM/454
Publication status	Published - 2006

All Science Journal Classification (ASJC) codes

General Mathematics

Keywords

Critical point theory
Differential equations
Equazioni differenziali
Teoria dei punti critici

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10.4171/RLM/454

Cite this

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abstract = "Let Omega be a ball or an annulus in R\textasciicircum{}N and f absolutely continuous, superlinear, subcritical, and such that f(0)=0. We prove that the least energy nodal solution of -Delta u= f(u) is not radial. We also\textbackslash{}r\textbackslash{}nprove that Fucik eigenfunctions on the first nontrivial curve of the Fucik spectrum, are not radial. A related result holds for asymmetric weighted eigenvalue problems. An essential ingredient is a quadratic form generalizing the Hessian of the energy functional J at a solution. We give new estimates on the Morse index of this form at a radial solution. These estimates are of independent interest.",

keywords = "Critical point theory, Differential equations, Equazioni differenziali, Teoria dei punti critici, Critical point theory, Differential equations, Equazioni differenziali, Teoria dei punti critici",

author = "Thomas Bartsch and Marco Degiovanni",

year = "2006",

doi = "10.4171/RLM/454",

language = "English",

volume = "17",

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journal = "ATTI DELLA ACCADEMIA NAZIONALE DEI LINCEI. RENDICONTI LINCEI. MATEMATICA E APPLICAZIONI",

issn = "1120-6330",

publisher = "Accademia Nazionale dei Lincei:Via Lungara 10 Uff Diff Pubbl., I 00165 Rome Italy:011 39 06 68027230, EMAIL: [email protected], INTERNET: http://www.lincei.it, Fax: 011 39 06 68027334",

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T1 - Nodal solutions of nonlinear elliptic Dirichlet problems on radial domains

AU - Bartsch, Thomas

AU - Degiovanni, Marco

PY - 2006

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N2 - Let Omega be a ball or an annulus in R^N and f absolutely continuous, superlinear, subcritical, and such that f(0)=0. We prove that the least energy nodal solution of -Delta u= f(u) is not radial. We also\r\nprove that Fucik eigenfunctions on the first nontrivial curve of the Fucik spectrum, are not radial. A related result holds for asymmetric weighted eigenvalue problems. An essential ingredient is a quadratic form generalizing the Hessian of the energy functional J at a solution. We give new estimates on the Morse index of this form at a radial solution. These estimates are of independent interest.

AB - Let Omega be a ball or an annulus in R^N and f absolutely continuous, superlinear, subcritical, and such that f(0)=0. We prove that the least energy nodal solution of -Delta u= f(u) is not radial. We also\r\nprove that Fucik eigenfunctions on the first nontrivial curve of the Fucik spectrum, are not radial. A related result holds for asymmetric weighted eigenvalue problems. An essential ingredient is a quadratic form generalizing the Hessian of the energy functional J at a solution. We give new estimates on the Morse index of this form at a radial solution. These estimates are of independent interest.

KW - Critical point theory

KW - Differential equations

KW - Equazioni differenziali

KW - Teoria dei punti critici

KW - Critical point theory

KW - Differential equations

KW - Equazioni differenziali

KW - Teoria dei punti critici

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ER -

Nodal solutions of nonlinear elliptic Dirichlet problems on radial domains

Abstract

All Science Journal Classification (ASJC) codes

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