A General Mechanism of Diffusion in Hamiltonian Systems: Qualitative Results

Gidea, Marian; Llave, Rafael de la; Seara, Tere M.

doi:10.1002/cpa.21856

Cited by 29 publications

(58 citation statements)

References 89 publications

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“…in [31] that the finite-length diffusing orbits of the iterated function system on Λ correspond to Arnold diffusion in the original diffeomorphism near Λ ∪ Γ, under the assumption of strong transversality of homoclinic intersections. This result was generalised by Gidea, de la Llave and Seara [32] to the orbits of semi-infinite length.…”

Section: Introduction and Main Resultssupporting

confidence: 61%

“…In [31] it is proved (Lemma 4.4) that if two points on a normally-hyperbolic invariant manifold of a symplectic diffeomorphism are connected by an orbit of the iterated function system (IFS) formed by the inner and scattering maps, then there exists a trajectory of the original diffeomorphism that connects arbitrarily small neighbourhoods of those two points. Lemmas 3.11 and 3.12 of [32] show that the same is true when orbits of an IFS are infinite (in one direction). In this section we prove Theorem 1.1 using these facts.…”

Section: Energy Growthmentioning

confidence: 81%

“…Since unperturbed W s,u 1 (Λ) and W s,u 2 (Λ) are symmetric to each other, we will study W s,u 2 (Λ) only. From (32), the unperturbed invariant manifolds W s,u 2 (Λ) coincide and form a 3-dimensional (unperturbed) homoclinic manifold W 2 given by…”

Section: Scattering Map For B and Splitting Of Invariant Manifoldsmentioning

confidence: 99%

“…The shadowing Lemmas 3.11, 3.12 of [32] imply the existence of a true orbit of the map B that shadows the orbit of the IFS {Φ, S Γ }, so the energy E tends to infinity along this true orbit too (the shadowing lemmas of [32] require compactness of Λ, but it is easy to see that the result remains valid also in the situation where every orbit of the inner map is bounded -so the Poincare recurrence theorem can be used, and this property holds true in our case, as the KAM curves bound every orbit of Φ).…”

Section: Energy Growthmentioning

confidence: 99%

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Splitting of separatrices, scattering maps, and energy growth for a billiard inside a time-dependent symmetric domain close to an ellipse

2018

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We study billiard dynamics inside an ellipse for which the axes lengths are changed periodically in time and an O(δ)-small quartic polynomial deformation is added to the boundary. In this situation the energy of the particle in the billiard is no longer conserved. We show a Fermi acceleration in such system: there exists a billiard trajectory on which the energy tends to infinity. The construction is based on the analysis of dynamics in the phase space near a homoclinic intersection of the stable and unstable manifolds of the normally hyperbolic invariant cylinder Λ, parameterised by the energy and time, that corresponds to the motion along the major axis of the ellipse. The proof depends on the reduction of the billiard map near the homoclinic channel to an iterated function system comprised by the shifts along two Hamiltonian flows defined on Λ. The two flows approximate the so-called inner and scattering maps, which are basic tools that arise in the studies of the Arnold diffusion; the scattering maps defined by the projection along the strong stable and strong unstable foliations W ss,uu of the stable and unstable invariant manifolds W s,u (Λ) at the homoclinic points. Melnikov type calculations imply that the behaviour of the scattering map in this problem is quite unusual: it is only defined on a small subset of Λ that shrinks, in the large energy limit, to a set of parallel lines t = const as δ → 0. *

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Section: Introduction and Main Resultssupporting

confidence: 61%

Section: Energy Growthmentioning

confidence: 81%

Section: Scattering Map For B and Splitting Of Invariant Manifoldsmentioning

confidence: 99%

Section: Energy Growthmentioning

confidence: 99%

See 2 more Smart Citations

Splitting of separatrices, scattering maps, and energy growth for a billiard inside a time-dependent symmetric domain close to an ellipse

2018

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“…With the goal in mind of Arnol'd diffusion, obtaining the information on the effect of homoclinic excursions in the fast variables is a useful information. See [GdlLS14].…”

Section: Introductionmentioning

confidence: 99%

Global Melnikov Theory in Hamiltonian Systems with General Time-Dependent Perturbations

Gidea

Llave

2018

J Nonlinear Sci

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We consider a mechanical system consisting of n penduli and a d-dimensional generalized rotator subject to a time-dependent perturbation. The perturbation is not assumed to be either Hamiltonian, or periodic or quasi-periodic, we allow for rather general time-dependence.The strength of the perturbation is given by a parameter ε P R. For all |ε| sufficiently small, the augmented flow -obtained by making the time into a new variable -has a p2d`1q-dimensional normally hyperbolic locally invariant manifoldΛε.We define a Melnikov-type vector, which gives the first order expansion of the displacement of the stable and unstable manifolds ofΛ0 under the perturbation. We provide an explicit formula for the Melnikov vector in terms of convergent improper integrals of the perturbation along homoclinic orbits of the unperturbed system.We show that if the perturbation satisfies some explicit non-degeneracy conditions, then the stable and unstable manifolds ofΛε, W s pΛεq and W u pΛεq, respectively, intersect along a transverse homoclinic manifold, and, moreover, the splitting of W s pΛεq and W u pΛεq can be explicitly computed, up to the first order, in terms of the Melnikov-type vector. This implies that the excursions along some homoclinic trajectories yield a non-trivial increase of order Opεq in the action variables of the rotator, for all sufficiently small perturbations.The formulas that we obtain are independent of the unperturbed motions and give, at the same time, the effects on periodic, quasi-periodic, or general-type orbits.When the perturbation is Hamiltonian, we express the effects of the perturbation, up to the first order, in terms of a Melnikov potential. In addition, if the perturbation is periodic, we obtain that the nondegeneracy conditions on the Melnikov potential are generic.

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Arnold Diffusion, Quantitative Estimates, and Stochastic Behavior in the Three‐Body Problem

Capiński

Gidea

2021

Comm Pure Appl Math

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We consider a class of autonomous Hamiltonian systems subject to small, time‐periodic perturbations. When the perturbation parameter is set to zero, the energy of the system is preserved. This is no longer the case when the perturbation parameter is non‐zero. We describe a topological method to establish orbits which diffuse in energy for every suitably small perturbation parameter ε>0. The method yields quantitative estimates: (i)the existence of orbits along which the energy drifts by an amount independent of ε; the time required by such orbits to drift is O()1/ε; (ii)the existence of orbits along which the energy makes chaotic excursions; (iii)explicit estimates for the Hausdorff dimension of the set of such chaotic orbits; (iv)the existence of orbits along which the time evolution of energy approaches a stopped diffusion process (Brownian motion with drift), as ε tends to 0. For each ε fixed, the set of initial conditions of the orbits that yield the diffusion process has positive Lebesgue measure, and in the limit the measure of these sets approaches 0. Moreover, we can obtain any desired values of the drift and variance for the limiting Brownian motion for appropriate sets of initial conditions. A key feature of our topological method is that it can be implemented in computer‐assisted proofs. We give an application to a concrete model of the planar elliptic restricted three‐body problem, on the motion of an infinitesimal body relative to the Neptune‐Triton system. © 2021 The Authors. Communications on Pure and Applied Mathematics published by Wiley Periodicals LLC.

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A General Mechanism of Diffusion in Hamiltonian Systems: Qualitative Results

Cited by 29 publications

References 89 publications

Splitting of separatrices, scattering maps, and energy growth for a billiard inside a time-dependent symmetric domain close to an ellipse

Splitting of separatrices, scattering maps, and energy growth for a billiard inside a time-dependent symmetric domain close to an ellipse

Global Melnikov Theory in Hamiltonian Systems with General Time-Dependent Perturbations

Arnold Diffusion, Quantitative Estimates, and Stochastic Behavior in the Three‐Body Problem

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