2012
DOI: 10.1016/j.jde.2012.09.003
|View full text |Cite
|
Sign up to set email alerts
|

Exponentially small splitting of separatrices beyond Melnikov analysis: Rigorous results

Abstract: We study the problem of exponentially small splitting of separatrices of one degree of freedom classical Hamiltonian systems with a non-autonomous perturbation fast and periodic in time. We provide a result valid for general systems which are algebraic or trigonometric polynomials in the state variables. It consists on obtaining a rigorous proof of the asymptotic formula for the measure of the splitting. We obtain that the splitting has the asymptotic behavior K ε β e −a/ε , identifying the constants K , β, a … Show more

Help me understand this report

Search citation statements

Order By: Relevance

Paper Sections

Select...
2
1
1

Citation Types

0
58
0

Year Published

2013
2013
2020
2020

Publication Types

Select...
7
1

Relationship

2
6

Authors

Journals

citations
Cited by 38 publications
(58 citation statements)
references
References 50 publications
0
58
0
Order By: Relevance
“…p exp. q" r // for some p; q; r 2 Q, as in [2]. Nevertheless, to obtain the behavior of the error function g.…”
Section: A Qualitative Mechanism Of Diffusion In a Perturbative Symplmentioning
confidence: 99%
“…p exp. q" r // for some p; q; r 2 Q, as in [2]. Nevertheless, to obtain the behavior of the error function g.…”
Section: A Qualitative Mechanism Of Diffusion In a Perturbative Symplmentioning
confidence: 99%
“…In a neighborhood of γ, the form p = ∇S u,s (q) for the invariant manifolds W u,s is valid as far as the solution of the Riccati equation is bounded, since this allows us to use q 2 as the second parameter of the invariant manifolds. Otherwise, if the condition η(t) = 0 is not satisfied in the whole orbit γ, or the solution of the Riccati equation is not bounded, other parameters should be used (see [BFGS11] for the case of a 1 d.o.f with a periodic perturbation). We recall that, if the configuration manifold Q is compact and the potential V (ξ) has a unique nondegenerate maximum, and γ is a homoclinic orbit asymptotic to this maximum, then the condition η(t) = 0 is always satisfied (see the last paragraph of Section 1.2).…”
Section: Justification Of the Hypothesesmentioning
confidence: 99%
“…In this paper we prove that it is indeed a first order of ∆E. Note that this is not always the case: in general problems presenting exponentially small phenomena, often the Melnikov integral is not the dominant part of the total loss of energy over a separatrix of a Hamiltonian system (see [2]).…”
Section: Introductionmentioning
confidence: 81%
“…The model. The sine-Gordon equation is a nonlinear hyperbolic partial differential equation given by (1) ∂ 2 t u − ∂ 2 x u + sin(u) = 0, which presents a family of kinks u k (x, t) given by (2) u k (x, t) = 4 arctan exp…”
Section: Introductionmentioning
confidence: 99%