We perform a bifurcation analysis of normal-internal resonances in parametrized families of quasi-periodically forced Hamiltonian oscillators, for small forcing. The unforced system is a one degree of freedom oscillator, called the `backbone' system; forced, the system is a skew-product flow with a quasi-periodic driving with n basic frequencies. The dynamics of the forced system are simplified by averaging over the orbits of a linearization of the unforced system. The averaged system turns out to have the same structure as in the well-known case of periodic forcing (n = 1); for a real analytic system, the non-integrable part can even be made exponentially small in the forcing strength. We investigate the persistence and the bifurcations of...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
AbstractThe subject of this paper is two-quasiperiodicity in a large class of one-and-a-half degree ...
Quasi-periodic solutions can arise in assemblies of nonlinear oscillators as a consequence of Neimar...
We perform a bifurcation analysis of normal-internal resonances in parametrized families of quasi-pe...
In the conservative dynamics of certain quasi-periodically forced oscillators, normal-internal reson...
We perform a bifurcation analysis of normal-internal resonances in parametrized families of quasi-pe...
This paper investigates a family of nonlinear oscillators at Hopf bifurcation, driven by a small qua...
Quasi-periodic solutions can arise in assemblies of nonlinear oscillators as a consequence of Neimar...
We study quasi-periodic tori under a normal-internal resonance, possibly with multiple eigenvalues. ...
This paper deals with families of periodically forced oscillators undergoing a Hopf-Nĕımarck-Sacker...
We study the dynamics of two conservative librating oscillators with perturbations from a linear dis...
Abstract. Parametric excitations are capable of stabilizing an unstable state, but they can also des...
We consider families of dynamical systems having invariant tori that carry quasi-periodic motions. O...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
AbstractThe subject of this paper is two-quasiperiodicity in a large class of one-and-a-half degree ...
Quasi-periodic solutions can arise in assemblies of nonlinear oscillators as a consequence of Neimar...
We perform a bifurcation analysis of normal-internal resonances in parametrized families of quasi-pe...
In the conservative dynamics of certain quasi-periodically forced oscillators, normal-internal reson...
We perform a bifurcation analysis of normal-internal resonances in parametrized families of quasi-pe...
This paper investigates a family of nonlinear oscillators at Hopf bifurcation, driven by a small qua...
Quasi-periodic solutions can arise in assemblies of nonlinear oscillators as a consequence of Neimar...
We study quasi-periodic tori under a normal-internal resonance, possibly with multiple eigenvalues. ...
This paper deals with families of periodically forced oscillators undergoing a Hopf-Nĕımarck-Sacker...
We study the dynamics of two conservative librating oscillators with perturbations from a linear dis...
Abstract. Parametric excitations are capable of stabilizing an unstable state, but they can also des...
We consider families of dynamical systems having invariant tori that carry quasi-periodic motions. O...
We consider an autoparametric system which consists of an oscillator coupled with a parametricallyex...
AbstractThe subject of this paper is two-quasiperiodicity in a large class of one-and-a-half degree ...
Quasi-periodic solutions can arise in assemblies of nonlinear oscillators as a consequence of Neimar...