Transition,Ergodicity and Lyapunov Spectra of Hamiltonian Dynamical Systems
スポンサーリンク
概要
- 論文の詳細を見る
Hamiltonian systems on a one-dimensional lattice with discrete time are studied.As the coupling constant is increased, they show a sharp transition from regular torandom motion. Below the threshold, KAM tori and a stochastic layer coexist. Thestochastic motion therein is sticky to KAM tori and has a long time-tail. The motionabove the threshold is ergodic, characterized by the power spectra and Lyapunov spec-tra which are consistent with the results of random matrices.
- 社団法人日本物理学会の論文
- 1987-09-15
著者
-
Konishi Tetsuro
Institute Of Physics College Of Arts And Sciences University Of Tokyo
-
Kaneko Kunihiko
Institute Of Physics College Of Arts And Sciences University Of Tokyo
-
Kaneko Kunihiko
Institute Of Physics College Of Arts And Sciences
-
KANEKO Kunihiko
Institute of Physics,College of Arts and Sciences,University of Tokyo
-
KONISHI Tetsuro
Institute of Physics,College of Arts and Sciences,University of Tokyo
関連論文
- The Quantum Nonlinear Schrodinger Model;Gelfand-Levitan Equation and Classical Soliton
- Transition,Ergodicity and Lyapunov Spectra of Hamiltonian Dynamical Systems
- Resonant Breakup of Quantum Soliton by External Force
- Complexity in Basin Structures and Information Processing by the Transition among Attractors
- Evolution of a Symbiotic Network(Mathematical Topics in Biology)
- Spatiotemporal Complexity in Coupled Map Lattices
- Towards Thermodynamics of Spatiotemporal Chaos : Complex Dynamics in Nonlinear Systems
- Spatiotemporal Intermittency in Coupled Map Lattices : Condensed Matter and Statistical Physics