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Researcher Information

last modified:2024/11/24

Associate Professor KAMIMOTO, Shingo

Faculty, Affiliation

Faculty of Mathematics and Physics, Institute of Science and Engineering

College and School Educational Field


Laboratory

Academic Background

Career

Year & Month of Birth

Academic Society

Award

Specialities

Basic analysis

Speciality Keywords

asymptotic analysis, resurgence theory, exact WKB analysis

Research Themes

Books

Papers

  •  Resurgent transseries, mould calculus and Connes-Kreimer Hopf algebra Shingo Kamimoto Proc. Japan Acad. Ser. A Math. Sci. 99 9 65 2023/11
  •  Resurgent functions and nonlinear systems of differential and difference equations Shingo Kamimoto Advances in Mathematics 406 2022/09/17
  •  Convolution product and resurgence Shingo Kamimoto Complex Differential and Difference Equations 219 2020
  •  Multisummability in Carleman ultraholomorphic classes by means of nonzero proximate orders Jimenez-Garrido, Javier,Kamimoto, Shingo,Lastra, Alberto,Sanz, Javier JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS 472 1 627 2019/04/01
  •  On the Singularity Structure of WKB Solution of the Boosted Whittaker Equation: its Relevance to Resurgent Functions with Essential Singularities Shingo Kamimoto,Takahiro Kawai,Tatsuya Koike LETTERS IN MATHEMATICAL PHYSICS 106 12 1791 2016/12

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  •  Resurgence of formal series solutions of nonlinear differential and difference equations Shingo Kamimoto PROCEEDINGS OF THE JAPAN ACADEMY SERIES A-MATHEMATICAL SCIENCES 92 8 92 2016/10
  •  Nonlinear analysis with endlessly continuable functions Shingo Kamimoto and David Sauzin RIMS Kokyuroku Bessatsu B57 235 2016
  •  Exact WKB analysis of a Schrodinger equation with a merging triplet of two simple poles and one simple turning point, I - Its WKB-theoretic transformation to the Mathieu equation Shingo Kamimoto,Takahiro Kawai,Yoshitsugu Takei ADVANCES IN MATHEMATICS 260 458 2014/08
  •  Exact WKB analysis of a Schrodinger equation with a merging triplet of two simple poles and one simple turning point, II - Its relevance to the Mathieu equation and the Legendre equation Shingo Kamimoto,Takahiro Kawai,Yoshitsugu Takei ADVANCES IN MATHEMATICS 260 565 2014/08
  •  On the Borel summability of 0-parameter solutions of nonlinear ordinary differential equations Shingo Kamimoto,Tatsuya Koike RIMS Kokyuroku Bessatsu B40 191 2013
  •  Microlocal analysis of fixed singularities of WKB solutions of a Schrödinger equation with a merging triplet of two simple poles and one simple turning point Shingo Kamimoto,Takahiro Kawai,Yoshitsugu Takei The Mathematical Legacy of Leon Ehrenpreis 125 2012
  •  On a Schrödinger equation with a merging pair of a simple pole and a simple turning point -- Alien calculus of WKB solutions through microlocal analysis Shingo Kamimoto, Takahiro Kawai, Tastuya Koike and Yoshitsugu Takei Asymptotics in Dynamics, Geometry and PDEs; Generalized Borel Summation vol. II 245 2011
  •  On the WKB theoretic structure of the Schrödinger operators with a merging pair of a simple pole and a simple turning point Shingo Kamimoto,Takahiro Kawai,Tastuya Koike,Yoshitsugu Takei Kyoto J. Math. 50 101 2010
  •  Iterated convolutions and endless Riemann surfaces S. Kamimoto, D. Sauzin Ann. Sc. Norm. Super. Pisa Cl. Sci. XX 5 177-215 2020

Conference Presentations

  • Multisummability for strongly regular sequences(conference:Algebraic analysis and Asymptotic analysis in Hokkaido)(2018/05/16)
  • Iterated Convolution and the Resurgence of Formal Solutions of Nonlinear ODE(conference:Applicable resurgent asymptotics: towards a universal theory)(2021/06/18)
  • On the Borel summability of WKB theoretic transformation series(2019/01/07)
  • Resurgence and iterated convolution(conference:Algebraic Analysis in Yamaguchi - D-module, microlocal analysis, summability)(2017/11/04)
  • Resurgence of WKB solutions(conference:Prospects in microlocal analysis and asymptotic analysis)(2024/10/08)

Others

Arts and Fieldwork

Patent

Theme to the desired joint research

Grant-in-Aid for Scientific Research

○「位相的漸化式, 量子曲線とリサージェンス理論」(2024-2029) 
○「Mould 解析を用いた Resurgence 理論の研究」(2022-2027) 
○「リサージェンス理論と数理物理学」(2018-2023) 

Competitive research funding,Contribution

Collaborative research,Consignment study

Classes (Bachelors)

Classes (Graduate Schools)

International Project

International Students

Lecture themes

Others (Social Activities)

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