Miwa Tetsuji | Research Institute For Mathematical Sciences Kyoto University
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概要
関連著者
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Miwa Tetsuji
Research Institute For Mathematical Sciences Kyoto University
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MIWA Tetsuji
Research Institute for Mathematical Sciences, Kyoto University
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Jimbo Michio
Research Institute For Mathematical Sciences Kyoto University
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JIMBO Michio
Research Institute for Mathematical Sciences, Kyoto University
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Date Etsuro
Department Of Mathematical Science Faculty Of Engineering Science Osaka University
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Jimbo Michio
Department Of Mathematics Faculty Of Science Kyoto University
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Sato Mikio
Research Institute For Mathematical Sciences Kyoto University
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Date Etsuo
Department Of Mathematical Science Faculty Of Engineering Science Osaka University
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DATE Etsuro
Faculty of General Education, Kyoto University
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KASHIWARA Masaki
Research Institute for Mathematical Sciences, Kyoto University
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Kashiwara Masaki
Research Institute For Mathematical Sciences Kyoto University
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OSHIMA Toshio
Department of Mathematics, Faculty of Science, The University of Tokyo
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Oshima Toshio
Department Of Mathematics Faculty Of Science The University Of Tokyo
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Oshima Toshio
Department Of Mathematical Sciences University Of Tokyo
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Date Etsuro
Department Of Mathematics College Of General Education Kyoto University
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MIKI Kei
Yukawa Institute for Theoretical Physics, Kyoto University
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JINBO Michio
Research Institute for Mathematical Sciences,Kyoto University
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Miki Kei
Yukawa Institute For Theoretical Physics Kyoto University
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Oshima Toshio
Department Of Chemical Engineering Faculty Of Engineering Himeji Institute Of Technology
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Jinbo Michio
Research Institute For Mathematical Sciences Kyoto University
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Miwa Tetsuji
Research Institute for Mathematical Sciences,Kyoto University
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Tarasov Vitaly
St. Petersburg Branch Of Steklov Mathematical Institute
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TAKEYAMA Yoshihiro
Research Institute for Mathematical Sciences, Kyoto University
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Jimbo Michio
Institute For Theoretical Physics State University Of New York At Stony Brook:research Institute For
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Miwa T
Research Institute For Mathematical Sciences Kyoto University
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Miwa Tetsuji
Institute For Theoretical Physics State University Of New York At Stony Brook:research Institute For
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MIWA Tetuji
Research Institute for Mathematical Sciences, Kyoto University
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Yan H
Univ. Sydney Nsw Aus
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FODA Omar
Department of Mathematics, University of Melbourne
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IOHARA Kenji
Department of Mathematics, Faculty of Science, Kyoto University
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KEDEM Rinat
Research Institute for Mathematical Sciences, Kyoto University
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YAN Hong
Institute of Theoretical Physics
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Foda Omar
Department Of Mathematics University Of Melbourne
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Kedem Rinat
Research Institute For Mathematical Sciences Kyoto University
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Iohara K
Kyoto Univ. Kyoto Jpn
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Iohara Kenji
Department Of Mathematics Kyoto University : Jsps Research Fellow
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DATE Etsuo
Department of Mathematical Science, Faculty of Engineering Science, Osaka University
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Takeyama Yoshihiro
Research Institute For Mathematical Sciences Kyoto University
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Jimbo Michio
Department of Mathematics, Faculty of Science, Kyoto University
著作論文
- Determinant Formula for Solutions of the Quantum Knizhnik-Zamolodchikov Equation Associated with $U_q(sl_n)$ at $|q|=1$
- Supplement to Holonomic Quantum Fields. IV
- Holonomic Quantum Fields. V
- Holonomic Quantum Fields. IV
- Holonomic Quantum Fields III
- Holonomic Quantum Fields. II-The Riemann-Hilbert Problem-
- Holonomic Quantum Fields I
- Monodromy Preserving Deformation of Linear Differential Equations and Quantum Field Theory (非線形発展方程式に関する数理物理的研究(研究会報告))
- Holonomy Structure of Landau Singularities and Feynman Integrals
- Quasi-Periodic Solutions of the Orthogonal KP Equation-Transformation Groups for Soliton Equations V-
- Transformation Groups for Soliton Equations-Euclidean Lie Algebras and Reduction of the KP Hierarchy-
- KP Hierarchies of Orthogonal and Symplectic Type : Transformation Groups for Soliton Equations VI
- Operator Approach to the Kadomtsev-Petviashvili Equation : Transformation Groups for Soliton Equations III
- Notes on Highest Weight Modules of the Elliptic Algebra [numerical formula]
- Introduction to Microlocal Analysis
- New $R$ Matrices Associated with Cyclic Representations of $U\sb q(A\sp {(2)}\sb 2)$
- Cyclic Representations of $\textit{U}_q(\mathfrak{s}\mathcal{I}$(n+1, $\textbf{C}))$
- Method for Generating Discrete Soliton Equations.IV
- Method for Generating Discrete Soliton Equation.III
- Method for Generating Discrete Soliton Equation.II
- Method for Generating Discrete Soliton Equations.I
- Solitons and Infinite-Dimensional Lie Algebras
- Painleve Property of Monodromy Preserving Deformation Equations and the Analyticity of $\tau$ Functions
- Chifford Operators and Riemann's Monodromy Problem