Stability of odd periodic solutions in a resonant oscillator

Daniel Elías Nuñez Lopez; Andrés  Rivera; Gian Rossodivita

doi:10.1007/s10231-016-0580-9

Stability of odd periodic solutions in a resonant oscillator

Título traducido de la contribución: Estabilidad de soluciones periódicas con simetría impar en un oscilador resonante

Daniel Elías Nuñez Lopez, Andrés Rivera, Gian Rossodivita

Universidad del Zulia

Producción: Contribución a una revista › Artículo › revisión exhaustiva

2 Citas (Scopus)

Resumen

We obtain an odd 2 π-periodic solution φ in a driven differential equation

ẍ + g(x) = εp(t), where g and p are odd smooth functions with g^′(0) = n² for some n∈ N and g^″′(0) ≠ 0. The periodic solution φ is obtained by continuation of the equilibrium x≡ 0 of the unperturbed problem (ε= 0) for small ε. In order to prove this result, we establish an extension of a Loud’s version of the implicit function theorem at rank 0. Moreover, we present sufficient conditions for the existence of one or three odd 2 π-periodic continuations and also we give conditions for their linear stability.

Título traducido de la contribución	Estabilidad de soluciones periódicas con simetría impar en un oscilador resonante
Idioma original	Inglés
Páginas (desde-hasta)	443-455
Número de páginas	13
Publicación	Annali di Matematica Pura ed Applicata
Volumen	196
N.º	2
DOI	https://doi.org/10.1007/s10231-016-0580-9 https://doi.org/10.1007/s10231-016-0580-9
Estado	Publicada - 01 abr. 2017

Palabras clave

Periodic Solutions
Lyapunov stability
Nonlinear oscillations
Implicit function theorem

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title = "Stability of odd periodic solutions in a resonant oscillator",

abstract = "We obtain an odd 2 π-periodic solution φ in a driven differential equation ẍ + g(x) = εp(t), where g and p are odd smooth functions with g′(0) = n2 for some n∈ N and g″′(0) ≠ 0. The periodic solution φ is obtained by continuation of the equilibrium x≡ 0 of the unperturbed problem (ε= 0) for small ε. In order to prove this result, we establish an extension of a Loud{\textquoteright}s version of the implicit function theorem at rank 0. Moreover, we present sufficient conditions for the existence of one or three odd 2 π-periodic continuations and also we give conditions for their linear stability.",

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AU - Rivera, Andrés

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N2 - We obtain an odd 2 π-periodic solution φ in a driven differential equation ẍ + g(x) = εp(t), where g and p are odd smooth functions with g′(0) = n2 for some n∈ N and g″′(0) ≠ 0. The periodic solution φ is obtained by continuation of the equilibrium x≡ 0 of the unperturbed problem (ε= 0) for small ε. In order to prove this result, we establish an extension of a Loud’s version of the implicit function theorem at rank 0. Moreover, we present sufficient conditions for the existence of one or three odd 2 π-periodic continuations and also we give conditions for their linear stability.

AB - We obtain an odd 2 π-periodic solution φ in a driven differential equation ẍ + g(x) = εp(t), where g and p are odd smooth functions with g′(0) = n2 for some n∈ N and g″′(0) ≠ 0. The periodic solution φ is obtained by continuation of the equilibrium x≡ 0 of the unperturbed problem (ε= 0) for small ε. In order to prove this result, we establish an extension of a Loud’s version of the implicit function theorem at rank 0. Moreover, we present sufficient conditions for the existence of one or three odd 2 π-periodic continuations and also we give conditions for their linear stability.

KW - Periodic Solutions

KW - Lyapunov stability

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Stability of odd periodic solutions in a resonant oscillator

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