A Derivation of a Langevin Type Map from a Many-Degrees-of-Freedom Symplectic Map and Its Invariant Measure : Progress Letters
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概要
- 論文の詳細を見る
Symplectic invariance of subsystem's dynamics in a many-degrees-of-freedom symplectic map is used to introduce a dissipative term in a Langevin type map which is dynamically equivalent to fully chaotic equilibrium map-orbits. Numerical evidence is given that invariant measures of the derived Langevin type maps are canonical.
- 理論物理学刊行会の論文
- 1992-01-25
著者
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Akiyama Shinji
Department Of Clinical Pharmaceutical Science Graduate School Of Medicine Dentistry And Pharmaceutic
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Akiyama Shinji
Department Of Physics Yamanashi Medical College
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AKIYAMA Shinji
Department of Physics, Kyoto University
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- A Derivation of a Langevin Type Map from a Many-Degrees-of-Freedom Symplectic Map and Its Invariant Measure : Progress Letters
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