Takei Yoshitsugu | Research Institute For Mathematical Sciences Kyoto University
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概要
関連著者
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Takei Yoshitsugu
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, Kyoto University
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Koike Tatsuya
Department Of Biochemistry Osaka University Faculty Of Dentistry
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Okaji Takashi
Department Of Mathematics Graduate School Of Science Kyoto University
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Takashi Okaji
Department Of Mathematics Graduate School Of Sciences Kyoto University
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Yoshitsugu Takei
Research Institute For Mathematical Sciences Kyoto University
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Yusaku HAMADA
Sakyo-ku, Kyoto
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Yusaku Hamada
Sakyo-ku Kyoto
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HAMADA Yusaku
Sakyo-ku, Kyoto
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Hamada Yusaku
Sakyo-ku Kyoto
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KAWAI Takahiro
Research Institute for Mathematical Sciences
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KOIKE TATSUYA
Department of Mathematics, Graduate School of Sciences, Kobe University
著作論文
- 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
- WKB analysis and deformation of Schrodinger equations
- Probleme de Cauchy et Goursat Analytique
- Singular-perturbative Reduction to Birkhoff Normal Form and Instanton-Type Formal Solutions of Hamiltonian Systems : To the memory of the late Professor Nobuhisa Iwasaki
- Toward the Exact WKB Analysis for Higher-Order Painleve Equations-The Case of Noumi-Yamada Systems-
- Toward the exact WKB analysis for instanton-type solutions of Painleve hierarchies(Algebraic, Analytic and Geometric Aspects of Complex Differential Equations and their Deformations. Painleve Hierarchies)
- Sato's conjecture for the Weber equation and transformation theory for Schrodinger equations with a merging pair of turning points (Differential Equations and Exact WKB Analysis)
- Exact WKB analysis of second-order non-homogeneous linear ordinary differential equations (Recent development of micro-local analysis for the theory of asymptotic analysis)