A. Vieiro scite author profile

We consider a one-parameter family of APM in a neighbourhood of an elliptic fixed point. As the parameter evolves hyperbolic and elliptic periodic orbits of different periods are created. The exceptional resonances of order less than 5 have to be considered separately. The invariant manifolds of the hyperbolic periodic points bound islands containing the elliptic periodic points. Generically, these manifolds split. It turns out that the inner and outer splittings are different under suitable conditions. We provide accurate formulae describing the splittings of these manifolds as a function of the parameter and the relative values of these magnitudes as a function of geometric properties. The numerical agreement is illustrated using mainly the Hénon map as an example.

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Dynamics in chaotic zones of area preserving maps: Close to separatrix and global instability zones

Simó

Vieiro

2011

Physica D: Nonlinear Phenomena

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Effect of Islands in Diffusive Properties of the Standard Map for Large Parameter Values

2014

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In this paper we review, based on massive, long term, numerical simulations, the effect of islands on the statistical properties of the standard map for large parameter values. Different sources of discrepancy with respect to typical diffusion are identified, the individual roles of them are compared and explained in terms of available limit models.To Mike Shub, on his 70th anniversary, with our best wishes and as a recognition to his great mathematical achievements

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Richness of dynamics and global bifurcations in systems with a homoclinic figure-eight

2013

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We consider 2D flows with a homoclinic figure-eight to a dissipative saddle. We study the rich dynamics that such a system exhibits under a periodic forcing. First, we derive the bifurcation diagram using topological techniques. In particular, there is a homoclinic zone in the parameter space with a non-smooth boundary. We provide a complete explanation of this phenomenon relating it to primary quadratic homoclinic tangency curves which end up at some cubic tangency (cusp) points. We also describe the possible attractors that exist (and may coexist) in the system. A main goal of this work is to show how the previous qualitative description can be complemented with quantitative global information. To this end, we introduce a return map model which can be seen as the simplest one which is 'universal' in some sense. We carry out several numerical experiments on the model, to check that all the objects predicted to exist by the theory are found in the model, and also to investigate new properties of the system.

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Splitting of the separatrices after a Hamiltonian–Hopf bifurcation under periodic forcing

2019

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We consider the effect of a non-autonomous periodic perturbation on a 2-dof autonomous system obtained as a truncation of the Hamiltonian-Hopf normal form. Our analysis focuses on the behaviour of the splitting of the invariant 2-dimensional stable/unstable manifolds. We analyse the different changes of dominant harmonic in the splitting functions. We describe how the dominant harmonics depend on the quotients of the continuous fraction expansion of the periodic forcing frequency. We have considered different frequencies including quadratic irrationals, frequencies having continuous fraction expansion with bounded quotients and frequencies with unbounded quotients. The methodology used is general enough to systematically deal with all these frequency types. All together allow us to get a detailed description of the asymptotic splitting behaviour for the concrete perturbation considered.

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A. Vieiro

Resonant zones, inner and outer splittings in generic and low order resonances of area preserving maps

Dynamics in chaotic zones of area preserving maps: Close to separatrix and global instability zones

Effect of Islands in Diffusive Properties of the Standard Map for Large Parameter Values

Richness of dynamics and global bifurcations in systems with a homoclinic figure-eight

Splitting of the separatrices after a Hamiltonian–Hopf bifurcation under periodic forcing

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