Generating Function and Its Formal Derivatives for Dynamical Systems
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概要
- 論文の詳細を見る
Generating function and its formal derivatives for one dimensional discrete dynamical systems are introduced. By taking its expansion parameter as complex analytic properties of these functions are investigated. Especially it is found that the Lyapunov exponent is given by the radius of convergence of the first derivative. The fractal nature of the generating function is also investigated.
- 理論物理学刊行会の論文
- 1986-08-25
著者
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KONNO Kimiaki
Department of Physics and Research Institute for Atomic Energy, College of Science and Technology, N
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Irie H
Research Information Center Institute Of Plasma Physics Nagoya University:department Of Physics Coll
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Irie Haruyuki
Department Of Physics College Of Science And Technology Nihon University
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Konno K
Nihon Univ. Tokyo
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SHIMADA Ippei
Atomic Energy research Institute, College of Science and Technology Nihon University
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Shimada I
Nihon Univ. Tokyo
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Shimada Ippei
Atomic Energy Research Institute College Of Science And Technology Nihon University
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Konno Kimiaki
Department Of Physics And Atomic Energy Research Institute College Of Science And Engineering Nihon
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Konno Kimiaki
Department of Physics,College of Science and Technology,Nihon University
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IRIE Haruyuki
Department of Physics, College of Science and Technology Nihon University
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KONNO Kimiaki
Department of Physics, College of Science and Technology Nihon University
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KONNO Kimiaki
Department of Physics, and Atomic Energy Research Institute College of Science and Engineering, Nihon University
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KONNO Kimiaki
Department of Physics, College of Science and Engineering Nihon University
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KONNO Kimiaki
Department of Physics and Atomic Energy Research Institute, College of Science and Engineering, Nihon University
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KONNO Kimiaki
Department of Physics and Research Institute for Atomic Energy College of Science and Engineering, Nihon University
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