Time-Dependent Orthogonal Polynomials and Theory of Soliton (統計物理学の展開と応用--多様性の中の類似性(研究会報告))
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概要
- 論文の詳細を見る
この論文は国立情報学研究所の電子図書館事業により電子化されました。By introducing a time variable to the theory of orthogonal polynomials, it is shown that the matrix models of two-dimensional gravity, the six vertex model of two-dimensional lattice statistics and the random matrix theory of level statistics are all described by the theory of soliton, i.e. Toda molecule equation.
- 物性研究刊行会の論文
- 1993-07-20
著者
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Sogo Kiyoshi
Institute Of Computational Fluid Dynamics
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Sogo Kiyoshi
Institute For Nuclear Study University Of Tokyo
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- Duality in ADE-Type Conformal Field Theory
- Time-Dependent Orthogonal Polynomials and Theory of Soliton : Applications to Matrix Model, Vertex Model and Level Statistics
- Time-Dependent Orthogonal Polynomials and Theory of Soliton (統計物理学の展開と応用--多様性の中の類似性(研究会報告))
- Excited States of Calogero-Sutherland-Moser Model : Classification by Young Diagrams
- Toda Molecule Equation and Quotient-Difference Method