Instability of bound states for abstract nonlinear Schrödinger equations (Q537713): Difference between revisions
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The author studies abstract Hamiltonian systems of the form \[ u'(t) = \tilde{J}E'(u(t)), \] where \(E\) is the energy functional on a real Hilbert space \(X\), \(J\) is a skew symmetric operator on \(X\), and \(\tilde{J}\) is a natural extension of \(J\) to the dual space \(X^*\). One assumes that the above equation is invariant under a one parameter group \(\{T(s); \, s\in \mathbb{R}\}\) of unitary operators on \(X\). The instability of the bound states \(T(\omega t)\varphi_{\omega}\) is studied, where \(\omega \in \mathbb{R}\) and \(\varphi_{\omega}\) is a solution of the corresponding stationary problem. Applications to nonlinear Schrödinger equations are given. | |||
| Property / review text: The author studies abstract Hamiltonian systems of the form \[ u'(t) = \tilde{J}E'(u(t)), \] where \(E\) is the energy functional on a real Hilbert space \(X\), \(J\) is a skew symmetric operator on \(X\), and \(\tilde{J}\) is a natural extension of \(J\) to the dual space \(X^*\). One assumes that the above equation is invariant under a one parameter group \(\{T(s); \, s\in \mathbb{R}\}\) of unitary operators on \(X\). The instability of the bound states \(T(\omega t)\varphi_{\omega}\) is studied, where \(\omega \in \mathbb{R}\) and \(\varphi_{\omega}\) is a solution of the corresponding stationary problem. Applications to nonlinear Schrödinger equations are given. / rank | |||
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| Property / reviewed by | |||
| Property / reviewed by: Gheorghe Moroşanu / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 34G20 / rank | |||
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| Property / Mathematics Subject Classification ID | |||
| Property / Mathematics Subject Classification ID: 35Q55 / rank | |||
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| Property / zbMATH DE Number | |||
| Property / zbMATH DE Number: 5898828 / rank | |||
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| Property / zbMATH Keywords | |||
Hamiltonian systems | |||
| Property / zbMATH Keywords: Hamiltonian systems / rank | |||
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| Property / zbMATH Keywords | |||
nonlinear Schrödinger equations | |||
| Property / zbMATH Keywords: nonlinear Schrödinger equations / rank | |||
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| Property / zbMATH Keywords | |||
bound states | |||
| Property / zbMATH Keywords: bound states / rank | |||
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| Property / zbMATH Keywords | |||
instability | |||
| Property / zbMATH Keywords: instability / rank | |||
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Revision as of 09:27, 1 July 2023
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Instability of bound states for abstract nonlinear Schrödinger equations |
scientific article |
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Instability of bound states for abstract nonlinear Schrödinger equations (English)
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20 May 2011
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The author studies abstract Hamiltonian systems of the form \[ u'(t) = \tilde{J}E'(u(t)), \] where \(E\) is the energy functional on a real Hilbert space \(X\), \(J\) is a skew symmetric operator on \(X\), and \(\tilde{J}\) is a natural extension of \(J\) to the dual space \(X^*\). One assumes that the above equation is invariant under a one parameter group \(\{T(s); \, s\in \mathbb{R}\}\) of unitary operators on \(X\). The instability of the bound states \(T(\omega t)\varphi_{\omega}\) is studied, where \(\omega \in \mathbb{R}\) and \(\varphi_{\omega}\) is a solution of the corresponding stationary problem. Applications to nonlinear Schrödinger equations are given.
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Hamiltonian systems
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nonlinear Schrödinger equations
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bound states
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instability
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