Search results for " Limit Cycle"

showing 3 items of 3 documents

A note on a generalization of Françoise's algorithm for calculating higher order Melnikov functions

2004

In [J. Differential Equations 146 (2) (1998) 320–335], Françoise gives an algorithm for calculating the first nonvanishing Melnikov function M of a small polynomial perturbation of a Hamiltonian vector field and shows that M is given by an Abelian integral. This is done under the condition that vanishing of an Abelian integral of any polynomial form ω on the family of cycles implies that the form is algebraically relatively exact. We study here a simple example where Françoise’s condition is not verified. We generalize Françoise’s algorithm to this case and we show that M belongs to the C[log t, t, 1/t] module above the Abelian integrals. We also establish the linear differential system ver…

Abelian integralMathematics(all)GeneralizationGeneral MathematicsHomotopyMathematical analysisApplied mathematicsOrder (group theory)Abelian integral; Melnikov function; Limit cycle; Fuchs systemMelnikov methodMathematics

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A generalization of Françoise's algorithm for calculating higher order Melnikov functions

2002

Abstract In [J. Differential Equations 146 (2) (1998) 320–335], Francoise gives an algorithm for calculating the first nonvanishing Melnikov function Ml of a small polynomial perturbation of a Hamiltonian vector field and shows that Ml is given by an Abelian integral. This is done under the condition that vanishing of an Abelian integral of any polynomial form ω on the family of cycles implies that the form is algebraically relatively exact. We study here a simple example where Francoise's condition is not verified. We generalize Francoise's algorithm to this case and we show that Ml belongs to the C [ log t,t,1/t] module above the Abelian integrals. We also establish the linear differentia…

Abelian integralMathematics(all)Hamiltonian vector fieldMelnikov functionDifferential equationGeneral MathematicsAbelian integralLimit cycleAbelian integral; Melnikov function; Limit cycle; Fuchs systemHamiltonian systemFuchs systemVector fieldAbelian groupAlgorithmHamiltonian (control theory)Linear equationMathematicsBulletin des Sciences Mathématiques

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Attractors/Basin of Attraction

2020

It is a controversial issue to decide who first coined the term “attractor”. According to Peter Tsatsanis, the editor of the English version of Prédire n’est pas expliquer, it was René Thom who first introduced such a term. It is necessary, however, to remember that Thom thought that it was first introduced by the American mathe- matician Steven Smale, “although Smale says it was Thom that coined the neolo- gism “attractor”“(Tsatsanis 2010: 63–64 n. 20). From this point of view, Bob Williams expressed a more cautious opinion by saying that “the word “attractor” was invented by these guys, Thom and Smale” (Cucker and Wong 2000: 183). But other mathematicians are of the opinion that the term …

Attractor Basin of Attraction Fixed Point Limit Cycle Torus Strange Attractors Dynamical SystemsPhilosophyAttractorEnglish versionMathematical economicsAttractionSettore M-FIL/05 - Filosofia E Teoria Dei LinguaggiNeologismTerm (time)

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