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A Poincaré-Bendixson theorem for scalar reaction diffusion equations (1989)

Fiedler, Bernold ; Mallet-Paret, John

Springer

Archive for rational mechanics and analysis 107 (1989), S. 325-345

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract For scalar equations $$u_t = u_{xx} + f(x, u, u_x )$$ with x ε S 1 and f ε C 2 we show that the classical theorem of Poincaré and Bendixson holds: the ω-limit set of any bounded solution satisfies exactly one of the following alternatives: - it consists in precisely one periodic solution, or - it consists of solutions tending to equilibrium as $$t \to \pm \infty $$ This is surprising, because the system is genuinely infinite-dimensional.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00251553

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Global Hopf bifurcation of two-parameter flows (1986)

Fiedler, Bernold

Springer

Archive for rational mechanics and analysis 94 (1986), S. 59-81

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ISSN: 1432-0673

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics , Physics

Notes: Abstract The behavior of center-indices, as introduced by J. Mallet-Paret & J. Yorke, is analyzed for two-parameter flows. The integer sum of center-indices along a one-dimensional curve in parameter space is called the H-index. A nonzero H-index implies global Hopf bifurcation. The index H is not a homotopy invariant. This fact is due to the occurrence of stationary points with an algebraically double eigenvalue zero, which we call B-points. To each B-point we assign an integer B-index, such that the H-index relates to the B-indices by a formula such as occurs in the calculus of residues. This formula is easily applied to study global bifurcation of periodic solutions in diffusively coupled two-cells of chemical oscillators and to treat spatially heterogeneous time-periodic oscillations in porous catalysts.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1007/BF00278243

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Homoclinic Connections in Strongly Self-Excited Nonlinear Oscillators: The Melnikov Function and the Elliptic Lindstedt–Poincaré Method (2000)

Belhaq, Mohamed ; Fiedler, Bernold ; Lakrad, Faouzi

Springer

Nonlinear dynamics 23 (2000), S. 67-86

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ISSN: 1573-269X

Keywords: homoclinic bifurcations criteria ; elliptic Lindstedt–Poincaré method ; Melnikov function

Source: Springer Online Journal Archives 1860-2000

Topics: Mathematics

Notes: Abstract A criterion to predict bifurcation of homoclinic orbits instrongly nonlinear self-excited one-degree-of-freedom oscillator $$\ddot x + c_1 x + c_2 f(x) = \varepsilon g(\mu ,x,\dot x),$$ is presented. TheLindstedt–Poincaré perturbation method is combined formally withthe Jacobian elliptic functions to determine an approximation of thelimit cycles near homoclinicity. We then apply a criterion forpredicting homoclinic orbits, based on the collision of the bifurcatinglimit cycle with the saddle equilibrium. In particular we show that thiscriterion leads to the same results, formally and to leading order, asthe standard Melnikov technique. Explicit applications of this criterionto quadratic or cubic nonlinearities f(x) are included.

Type of Medium: Electronic Resource

URL: http://dx.doi.org/10.1023/A:1008316010341

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