Compactification and desingularization of spaces of polynomial Liénard equations (Q2493084): Difference between revisions
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| Property / cites work: Polynomial Liénard equations near infinity / rank | |||
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| Property / cites work: Qualitative theory of planar differential systems / rank | |||
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| Property / cites work: Hilbert's 16th problem for quadratic vector fields / rank | |||
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| Property / cites work: Q3831770 / rank | |||
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| Property / cites work: Putting a boundary to the space of Liénard equations / rank | |||
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| Property / cites work: Mathematical problems for the next century / rank | |||
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Revision as of 15:49, 24 June 2024
scientific article
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Compactification and desingularization of spaces of polynomial Liénard equations |
scientific article |
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Compactification and desingularization of spaces of polynomial Liénard equations (English)
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9 June 2006
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This interesting paper presents a good compactification for all spaces of polynomial Liénard systems \[ \dot{x}=y, \qquad \dot{y}=-g(x)-yf(x) \] with \(g(x)\) and \(f(x)\) polynomials of degrees \(m\) and \(n\), respectively. The author shows that it is possible to compactify and desingularize the space of such system for each \((m,n)\) separately by using both Hamiltonian and singular perturbations.
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Liénard equation
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Hilbert's 16th problem
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limit cycle
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compactification
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desingularization
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Hamiltonian perturbation
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singular perturbation
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