Add to ORKGAfter reviewing a number of results from geometric singular perturbation theory, we give an example of a theorem for periodic solutions in a slow manifold. This is illustrated by examples involving the van der Pol-equation and a modified logistic equation. Regarding nonhyperbolic transitions we discuss a 4-dimensional relaxation oscillation and also canardlike solutions emerging from the modified logistic equation with sign-alternating growth rates
We study persistence of periodic solutions of perturbed slowly varying discontinuous differential eq...
We look for periodic solutions for a dynamical system on a non-complete Riemannian manifold. If the...
International audienceIn this chapter we gather recent results on piecewise-linear (PWL) slow-fast d...
After reviewing a number of results from geometric singular perturbation theory, we discuss several ...
Invited lecture at Konferensi Nasional Matematika XIII, Semarang, 24-27 juli, 2006; to be publ. in J...
Summary. The solutions of autonomous dynamical systems with periodic coef-ficients mainly depend on ...
AbstractWe give a geometric analysis of relaxation oscillations and canard cycles in singularly pert...
AbstractThe existence of periodic relaxation oscillations in singularly perturbed systems with two s...
Equations with periodic coefficients for singularly perturbed growth can be analysed by using fast a...
Equations with periodic coefficients for singularly perturbed growth can be analysed by using fast a...
Relaxation oscillations are highly non-linear oscillations, which appear to feature many important b...
Relaxation oscillations or stick-slip dynamics exhibited by a model, originally proposed for a form ...
This paper is concerned with the geometry of slow manifolds of a dynamical system with one fast and ...
Abstract. Approximately invariant elliptic slow manifolds are constructed for the Lorenz– Krishnamur...
We investigate the organization of mixed-mode oscillations in the self-coupled FitzHugh-Nagumo syste...
We study persistence of periodic solutions of perturbed slowly varying discontinuous differential eq...
We look for periodic solutions for a dynamical system on a non-complete Riemannian manifold. If the...
International audienceIn this chapter we gather recent results on piecewise-linear (PWL) slow-fast d...
After reviewing a number of results from geometric singular perturbation theory, we discuss several ...
Invited lecture at Konferensi Nasional Matematika XIII, Semarang, 24-27 juli, 2006; to be publ. in J...
Summary. The solutions of autonomous dynamical systems with periodic coef-ficients mainly depend on ...
AbstractWe give a geometric analysis of relaxation oscillations and canard cycles in singularly pert...
AbstractThe existence of periodic relaxation oscillations in singularly perturbed systems with two s...
Equations with periodic coefficients for singularly perturbed growth can be analysed by using fast a...
Equations with periodic coefficients for singularly perturbed growth can be analysed by using fast a...
Relaxation oscillations are highly non-linear oscillations, which appear to feature many important b...
Relaxation oscillations or stick-slip dynamics exhibited by a model, originally proposed for a form ...
This paper is concerned with the geometry of slow manifolds of a dynamical system with one fast and ...
Abstract. Approximately invariant elliptic slow manifolds are constructed for the Lorenz– Krishnamur...
We investigate the organization of mixed-mode oscillations in the self-coupled FitzHugh-Nagumo syste...
We study persistence of periodic solutions of perturbed slowly varying discontinuous differential eq...
We look for periodic solutions for a dynamical system on a non-complete Riemannian manifold. If the...
International audienceIn this chapter we gather recent results on piecewise-linear (PWL) slow-fast d...