Rchr
J-GLOBAL ID:201601017880096161
Update date: Jan. 05, 2024
Nagao Hidehito
ナガオ ヒデヒト | Nagao Hidehito
Affiliation and department:
Research field (1):
Basic analysis
Research keywords (8):
可積分系
, 離散可積分系
, パンルヴェ方程式
, ガルニエ系
, isomonodromic deformation
, 超幾何関数
, 特殊関数
, 差分方程式
Research theme for competitive and other funds (4):
- 2023 - 2027 Multivariable and higher order extensions of discrete Painlev'e equation
- 2019 - 2024 Realizations of singular configure points of discrete Painlev'e equation
- 2020 - 2022 Mathematics education using math software
- 2017 - 2020 Active and programming learning using mathematical software
Papers (7):
MISC (3):
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Hidehito Nagao. Lax Pairs for Additive Difference Painlev\'e Equations. Memoirs of National Institute of Technology (KOSEN), Akashi College. 2023. 65. 33-41
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Hidehito Nagao. Painlevé equations of type VI and $q$-D5 arising from Padé approximation. Hokkaido University Technical Report Series in Mathematics. 2017. 168. 391-399
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Hidehito Nagao. $q$- Painlevé equation of type E6 arising from Padé approximation. Hokkaido University Technical Report Series in Mathematics. 2016. 165. 199-204
Books (2):
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Padé Methods for Painlevé Equations
Springer Briefs in Mathematical Physics 2021 ISBN:9789811629983
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LIBRARY 工学基礎 & 高専TEXT 別巻1 詳解と演習 大学編入試験問題〈数学〉
数理工学社(サイエンス社) 2020 ISBN:9784864810654
Lectures and oral presentations (29):
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A multivariable generalization of the additive difference Painlev\'e equation with affine Weyl group symmetry type $D_4^{(1)}$
(Session on Infinite Integrability System, MSJ Autumn Meeting (Tohoku University) 2023)
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A multivariable generalization of the additive difference Painlev\'e equation with affine Weyl group symmetry type $D_4^{(1)}$
(Complex Differential and Difference Equations Il, Stefan Banach International Mathematical Center in Będlewo, Poland 2023)
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A certain factorized matrix Lax from
(Session on Infinite Integrability System, MSJ Autumn Meeting (Hokkaido University) 2022)
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Padé method and $q$-quadratic Garner systems
(Session on Infinite Integrability System, MSJ Annual Meeting (Nihon University) 2020)
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Padé approximation and Painlevé equations
(RIMS Symposium MAAA2019, Microlocal Analysis and Asymptotic Analysis, Kyoto University 2019)
more...
Professional career (1):
Association Membership(s) (3):
THE JAPAN ASSOCIATION FOR COLLEGE OF TECHNOLOGY
, JAPAN SOCIETY OF MATHEMATICAL EDUCATION
, THE MATHEMATICAL SOCIETY OF JAPAN
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