Abundance of fast growth of the number of periodic points in two-dimensional area-preserving dynamics
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Publication:2412375
DOI10.1007/s00220-017-2972-0zbMath1380.37046arXiv1603.08639OpenAlexW2613389295MaRDI QIDQ2412375
Publication date: 23 October 2017
Published in: Communications in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1603.08639
Hamiltonian diffeomorphismKAM theoryperiodic pointtwo-dimensional torusarea-preserving diffeomorphism
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Related Items (2)
Degenerate behavior in non-hyperbolic semigroup actions on the interval: fast growth of periodic points and universal dynamics ⋮ Complexities of differentiable dynamical systems
Cites Work
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- Generic 3-dimensional volume-preserving diffeomorphisms with superexponential growth of number of periodic orbits
- Stretched exponential estimates on growth of the number of periodic points for prevalent diffeomorphisms. I
- Super exponential growth of the number of periodic orbits inside homoclinic classes
- Julia-Fatou-Sullivan theory for real one-dimensional dynamics
- Generic diffeomorphisms with superexponential growth of number of periodic orbits
- An extension of the Artin-Mazur theorem
- Generic family displaying robustly a fast growth of the number of periodic points
- Diffeomorphisms with infinitely many sinks
- On periodic points
- Degenerate behavior in non-hyperbolic semigroup actions on the interval: fast growth of periodic points and universal dynamics
- A global perspective for non-conservative dynamics
- Generic family with robustly infinitely many sinks
- A stretched exponential bound on the rate of growth of the number of periodic points for prevalent diffeomorphisms I
- A stretched exponential bound on the rate of growth of the number of periodic points for prevalent diffeomorphisms II
- A Cr unimodal map with an arbitrary fast growth of the number of periodic points
- From a differentiable to a real analytic perturbation theory, applications to the Kupka Smale theorems
- A Finiteness Problem for One Dimensional Maps
- Prevalence: a translation-invariant “almost every” on infinite-dimensional spaces
- Prevalence
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