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A Direct Approach to Homoclinic Orbits in the Fast Dynamics of Singularly Perturbed Systems (1999)

Beyn, Wolf-Jürgen ; Stiefenhofer, Matthias

Springer

Journal of dynamics and differential equations 11 (1999), S. 671-709

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ISSN: 1572-9222

Keywords: Homoclinic orbits ; singular perturbations ; bifurcation ; FitzHugh–Nagumo system

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract Homoclinic orbits in the fast dynamics of singular perturbation problems are usually analyzed by a combination of Fenichel's invariant manifold theory with general transversality arguments (see Ref. 29 and the Exchange Lemma in Ref. 16). In this paper an alternative direct approach is developed which uses a two-time scaling and a contraction argument in exponentially weighted spaces. Homoclinic orbits with one last transition are treated and it is shown how ε-expansions can be extracted rigorously from this approach. The result is applied to a singularity perturbed Bogdanov point in the FitzHugh–Nagumo system.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1022663512855

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On invariant closed curves for one-step methods (1987)

Beyn, Wolf-Jürgen

Springer

Numerische Mathematik 51 (1987), S. 103-122

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ISSN: 0945-3245

Keywords: AMS(MOS) 65L05, 58F08, 58F22 ; CR: G1.7

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary We show that a one-step method as applied to a dynamical system with a hyperbolic periodic orbit, exhibits an invariant closed curve for sufficiently small step size. This invariant curve converges to the periodic orbit with the order of the method and it inherits the stability of the periodic orbit. The dynamics of the one-step method on the invariant curve can be described by the rotation number for which we derive an asymptotic expression. Our results complement those of [2, 3] where one-step methods were shown to create invariant curves if the dynamical system has a periodic orbit which is stable in either time direction or if the system undergoes a Hopf bifurcation.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01399697

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Zur Stabilität von Differenzenverfahren für Systeme linearer gewöhnlicher Randwertaufgaben (1978)

Beyn, Wolf-Jürgen

Springer

Numerische Mathematik 29 (1978), S. 209-226

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ISSN: 0945-3245

Keywords: AMS(MOS): 65L 10 ; CR: 5.17

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Summary In this paper we give a simple stability theory for finite difference approximations to linear ordinary boundary value problems. In particular we consider stability with respect to a maximum norm including all difference quotients up to the order of the differential equation. It is shown that stability in this sense holds if and only if the principal part of the differential equation is discretized in a “stable way”. This last property is characterized by root conditions which we prove to be satisfied for some classes of finite difference schemes. Our approach simplifies and generalizes some known results of the literature where Sobolev norms or merely the maximum norm are used.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF01390339

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