Add to ORKGWe prove the existence and local uniqueness of invariant tori on the verge of breakdown for two systems: the quasi-periodically driven logistic map and the quasi-periodically forced standard map. These systems exemplify two scenarios: the Heagy-Hammel route for the creation of strange non- chaotic attractors and the nonsmooth bifurcation of saddle invariant tori. Our proofs are computer- assisted and are based on a tailored version of the Newton-Kantorovich theorem. The proofs cannot be performed using classical perturbation theory because the two scenarios are very far from the perturbative regime, and fundamental hypotheses such as reducibility or hyperbolicity either do not hold or are very close to failing. Our proofs are based on a rel...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...
We show that the classic examples of quasi-periodically forced maps with strange nonchaotic attracto...
AbstractNearly integrable families of Hamiltonian systems are considered in the neighbourhood of nor...
We prove the existence and local uniqueness of invariant tori on the verge of breakdown for two syst...
In this paper we present a numerical study of invariant tori in a lattice of coupled logistic maps. ...
In two previous papers [J. Differential Equations, 228 (2006), pp. 530 579; Discrete Contin. Dyn. Sy...
One approach to understand the chaotic dynamics of nonlinear dissipative systems is the study of non...
In this thesis we study the process of torus collisions in one-parameter families of quasi-periodica...
We consider families of dynamical systems having invariant tori that carry quasi-periodic motions. O...
Invariant tori of integrable dynamical systems occur both in the dissipative and in the conservative...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
We study numerically the disappearance of normally hyperbolic invariant tori in quasiperiodic system...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...
We show that the classic examples of quasi-periodically forced maps with strange nonchaotic attracto...
AbstractNearly integrable families of Hamiltonian systems are considered in the neighbourhood of nor...
We prove the existence and local uniqueness of invariant tori on the verge of breakdown for two syst...
In this paper we present a numerical study of invariant tori in a lattice of coupled logistic maps. ...
In two previous papers [J. Differential Equations, 228 (2006), pp. 530 579; Discrete Contin. Dyn. Sy...
One approach to understand the chaotic dynamics of nonlinear dissipative systems is the study of non...
In this thesis we study the process of torus collisions in one-parameter families of quasi-periodica...
We consider families of dynamical systems having invariant tori that carry quasi-periodic motions. O...
Invariant tori of integrable dynamical systems occur both in the dissipative and in the conservative...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
We consider the perturbed quasi-periodic dynamics of a family of reversible systems with normally 1:...
Two types of quasi-periodic Hopf bifurcations are known, in which a Whitney smooth family of quasi-p...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
We study numerically the disappearance of normally hyperbolic invariant tori in quasiperiodic system...
This paper focuses on the parametric abundance and the 'Cantorial' persistence under perturbations o...
We show that the classic examples of quasi-periodically forced maps with strange nonchaotic attracto...
AbstractNearly integrable families of Hamiltonian systems are considered in the neighbourhood of nor...