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J-GLOBAL ID:200901090217075456   Update date: Feb. 01, 2024

KAZUYUKI HASEGAWA

ハセガワ カズユキ | KAZUYUKI HASEGAWA
Affiliation and department:
Kanazawa University Institute of Human and Social Sciences, Faculty of Education

About Kanazawa University Institute of Human and Social Sciences, Faculty of Education


Job title: Professor
Homepage URL  (1): http://www.ed.kanazawa-u.ac.jp/~kazuhase/
Research field  (1): Geometry
Research keywords  (1): 四元数幾何学,ツイスター理論,部分多様体論
Research theme for competitive and other funds  (9):
  • 2021 - 2024 Complex geometric structures and their moduli on Lie groups and homogeneous spaces
  • 2018 - 2023 Reseach of quaternionic manifolds by using submanifold geometry
  • 2017 - 2022 The representation formulas for a surface of higher codimension and a submanifold and their application
  • 2015 - 2018 ツイスタープログラムに基づく四元数ケーラー多様体内の部分多様体の研究
  • 2013 - 2017 Property of super-conformal maps inherited from holomorphic maps and its application
Show all
Papers (27):
  • V. Cortés, ans, K.Hasegawa. The quaternionic/hypercomplex-correspondence. Osaka J. Math. 2021. 58. 1. 213-238
  • Kazuyuki Hasegawa. An inclusive immersion into a quaternionic manifold and its invariants. MANUSCRIPTA MATHEMATICA. 2017. 154. 3-4. 527-549
  • Hasegawa, Kazuyuki, Moriya, Katsuhiro. Twistor Lifts and Factorization for Conformal Maps from a Surface to the Euclidean Four-space. ADVANCES IN APPLIED CLIFFORD ALGEBRAS. 2017. 27. 2. 1243-1262
  • 長谷川和志. 四元数多様体への包含的はめこみとその不変量. 研究集会「部分多様体幾何とリー群作用2016」報告集. 2017. 100-107
  • Kazuyuki Hasegawa. A Nearly Kähler Submanifold with Vertically Pluri-Harmonic Lift. Springer Proceedings in Mathematics and Statistics. 2017. 49-58
more...
Lectures and oral presentations  (28):
  • 四元数/超複素対応
    (部分多様体幾何とリー群作用2021 2022)
  • The quaternionic/hypercomplex-correspondence and its converse
    (Special Geometry, Mirror Symmetry and Integrable Systems 2021)
  • The quaternionic/hypercomplex-correspondence
    (The 6th Workshop "Complex geometry and Lie groups" 2021)
  • A construction of a hypercomplex manifold from a quaternionnic manifold-the quaternionic/hypercomplex-correspondence-
    (2020)
  • An inclusive immersion in a quaternionic manifold and its invariants
    (Differential Geometry 2017)
more...
Education (2):
  • Tokyo University of Science
  • Tokyo University of Science Graduate School, Division of Natural Science
Professional career (1):
  • 博士(理学)
Work history (4):
  • 2009/04/01 - Kanazawa University
  • 2007/04/01 - 2009/03/31 Tokyo University of science
  • 2002/04/01 - 2009/03/31 Musashi Institute of Technology
  • 2002/04/01 - 2007/03/31 Tokyo University of Science
Association Membership(s) (1):
Mathematical Society of Japan
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