KAWAI TAKAHIRO | Research Institute for Mathematical Sciences, Kyoto University
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概要
関連著者
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KAWAI TAKAHIRO
Research Institute for Mathematical Sciences, Kyoto University
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Kawai Takahiro
Research Institute For Mathematical Sciences Kyoto University
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KAWAI Takahiro
Research Institute for Mathematical Sciences
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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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Matsuzawa Tadato
Department Of Mathematics Nagoya University
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OSHIMA Toshio
Department of Mathematics, Faculty of Science, The University of Tokyo
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Kashiwara Masaki
School Of Mathematics The Institute For Advanced Study
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STAPP Henry
Lawrence Berkely Laboratory, University of California
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Stapp Henry
Lawrence Berkeley Laboratory University Of California
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Stapp Henry
Lawrence Berkely Laboratory University Of California
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KASHIWARA Masaki
Mathematical Institute Nagoya University
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Oshima Toshio
Department Of Chemical Engineering Faculty Of Engineering Himeji Institute Of Technology
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Takei Yoshitsugu
Research Institute For Mathematical Sciences Kyoto University
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Matsuzawa Tadato
Department Of Mathematics Faculty Of Science Nagoya University
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OSHIMA Toshio
Research Institute for Mathematical Sciences Kyoto University
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MATSUZAWA Tadato
Department of Mathematics, Nagoya University
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KAWAI Takahiro
Department of Mathematics Faculty of Sciences University of Tokyo
著作論文
- On the Boundary Value of a Solution of the Heat Equation
- Professor Mikio Sato and Microlocal Analysis
- Monodromy Structure of Solutions of Holonomic Systems of Linear Differential Equations is Invariant under the Deformation of the System
- Holonomic Systems of Linear Differential Equations and Feynman Integrals
- On Holonomic Systems for $\displaystyle\Pi_{\imath=1}^{N}(f_1+\sqrt{-1}0)^\lambda \iota $
- Micro-Analytic Structure of the $\textit{S}$-Matrix and Related Functions
- On Holonomic Systems of Micro-differential Equations. III-Systems with Regular Singularities-
- Microlocal Analysis
- Micro-hyperbolic pseudo-differential operators I
- Structure of a single pseudo-differential equation in a real domain
- Half of the Toulouse Project Part 5 is Completed : Structure Theorem for Instanton-Type Solutions of $(P_J)_m$ (J = I,II or IV) near a Simple $P$-Turning Point of the First Kind (Algebraic Analysis and the Exact WKB Analysis for Systems of Differential Eq