Stability and instability for Gevrey quasi-convex near-integrable Hamiltonian systems

Marco, Jean-Pierre; Sauzin, David

doi:10.1007/s10240-003-0011-5

Cited by 96 publications

(208 citation statements)

References 35 publications

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“…These inequalities yield effective stability of the quasiperiodic motion near the invariant tori as in [10]. Effective stability of the action along all the trajectories for Gevrey smooth Hamiltonians has been obtained recently in in [7]. The importance of the Gevrey category for that kind of problems is indicated by Lochak [6].…”

Section: Note That φ Belongs Tomentioning

confidence: 95%

KAM theorem for Gevrey Hamiltonians

Popov¹

2004

Ergod. Th. Dynam. Sys.

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We consider Gevrey perturbations H of a completely integrable Gevrey Hamiltonian H 0 . Given a Cantor set Ω κ defined by a Diophantine condition, we find a family of KAM invariant tori of H with frequencies ω ∈ Ω κ which is Gevrey smooth in a Whitney sense. Moreover, we obtain a symplectic Gevrey normal form of the Hamiltonian in a neighborhood of the union Λ of the invariant tori. This leads to effective stability of the quasiperiodic motion near Λ. KAM theorem for Gevrey HamiltoniansLet D 0 be a bounded domain in R n , and T n = R n /2πZ n , n ≥ 2. We consider a class of real valued Gevrey Hamiltonians in T n × D 0 which are small perturbations of a real valued nondegenerate Gevrey Hamiltonian H 0 (I) depending only on the action variables I ∈ D 0 . Our aim is to obtain a family of KAM (Kolmogorov-Arnold-Moser) invariant tori Λ ω of H with frequencies ω in a suitable Cantor set Ω κ defined by a Diophantine condition and to prove Gevrey regularity for it. It turns out that for each ω ∈ Ω κ , Λ ω is a Gevrey smooth embedded torus having the same Gevrey regularity as the Hamiltonian H. Moreover, we shall prove that the family Λ ω , ω ∈ Ω κ , is Gevrey smooth with respect to ω in a Whitney sense, with a Gevrey index depending on the Gevrey class of H and on the exponent in the Diophantine condition. This naturally involves anisotropic Gevrey classes. Let ρ 1 , ρ 2 ≥ 1 and L 1 , L 2 be positive constants. Given a domain D ⊂ R n , we denote bywhere |α| = α 1 + · · · + α n and α! = α 1 ! · · · α n ! for α = (α 1 , . . . , α n ) ∈ N n . In the same way we define, and sometimes we do not indicate the Gevrey constants L 1 , L 2 .Let H 0 be a completely integrable real valued Gevrey smooth Hamiltonian T n × D 0 ∋ (θ, I) → H 0 (I) ∈ R. We suppose that H 0 is non-degenerate, which means that the map ∇H 0 : D 0 → Ω 0 is a diffeomorphism. Denote by g 0 ∈ C ∞ (Ω 0 ) the Legendre transform of H 0 (then ∇g 0 : Ω 0 → D 0 is the inverse map to ∇H 0 ). We suppose also that there are positive constants ρ > 1, A 0 > 0, and(Ω 0 ), andin the corresponding norms, defined as in (1.1). In particular, Ω 0 is a bounded domain. Given a subdomain D of D 0 we set Ω := ∇H 0 (D) ⊂ Ω 0 . Fix τ > n − 1 and κ > 0. We denote by Ω κ

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Section: Note That φ Belongs Tomentioning

confidence: 95%

KAM theorem for Gevrey Hamiltonians

Popov¹

2004

Ergod. Th. Dynam. Sys.

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“…Our primary goal is to present the geometrical essence of Arnold diffusion in what seems to be the simplest possible setting. A rich literature (see, e.g., [3], [8], [19]) on Arnold diffusion goes far beyond the example discussed here. We outline our construction in this Introduction, giving details in later sections.…”

Section: Vadim Kaloshin and Mark Levimentioning

confidence: 99%

“…Marco and Sauzin [19], in a collaboration started with Herman, presented such a family in the class of Gevrey 4 near-integrable Hamiltonians.…”

Section: Vadim Kaloshin and Mark Levimentioning

confidence: 99%

“…The famous Nekhoroshev stability estimates [27] show that for analytic near-integrable Hamiltonian systems with quasiconvex unperturbed Hamiltonian, diffusion time is at least exponentially long. Marco and Sausin [19] extend Nekhoroshev estimates to the Gevrey class and construct a family of examples in this class with optimal, i.e., maximal possible, speed of diffusion. In [9] Bourgain and Kaloshin give an open family of analytic examples which possess trajectories diffusing with optimal speed, thus proving optimality of the Nekhoroshev stability estimates [27].…”

Section: Vadim Kaloshin and Mark Levimentioning

confidence: 99%

“…To prove the estimate (19), notice that the minimum with respect to τ for |τ −T | < 4 √ ε is bounded from below by the one for |τ −T | < 25 √ ε. Thus it suffices to prove (19) T 2 .…”

Section: Arnold Diffusion For Near-integrable Hamiltonians 419mentioning

confidence: 99%

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An example of Arnold diffusion for near-integrable Hamiltonians

Калошин

Levi

2008

Bull. Amer. Math. Soc.

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Abstract. In this paper, using the ideas of Bessi and Mather, we present a simple mechanical system exhibiting Arnold diffusion. This system of a particle in a small periodic potential can be also interpreted as ray propagation in a periodic optical medium with a near-constant index of refraction. Arnold diffusion in this context manifests itself as an arbitrary finite change of direction for nearly constant index of refraction.

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Hamiltonian Perturbation Theory (and Transition to Chaos)

Broer

Hanßmann²

2009

Encyclopedia of Complexity and Systems Science

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Stability and instability for Gevrey quasi-convex near-integrable Hamiltonian systems

Cited by 96 publications

References 35 publications

KAM theorem for Gevrey Hamiltonians

KAM theorem for Gevrey Hamiltonians

An example of Arnold diffusion for near-integrable Hamiltonians

Hamiltonian Perturbation Theory (and Transition to Chaos)

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