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J-GLOBAL ID:201701014732550285   Update date: Feb. 02, 2024

Kawakami Tatsuki

カワカミ タツキ | Kawakami Tatsuki
Affiliation and department:
Job title: Professor
Homepage URL  (2): https://kawakami.math.ryukoku.ac.jp/kawakami.htmlhttps://kawakami.math.ryukoku.ac.jp/kawakami-e.html
Research field  (1): Mathematical analysis
Research keywords  (5): 拡散方程式 ,  高次漸近展開 ,  動的境界条件 ,  分数冪拡散方程式 ,  偏微分方程式
Research theme for competitive and other funds  (13):
  • 2022 - 2027 New trends in parabolic equations with nonlocal structures
  • 2020 - 2024 動的境界条件を有する拡散方程式の非線形問題への展開
  • 2019 - 2024 Systematical geometric analysis and asymptotic analysis for evolution equations
  • 2019 - 2023 Research on the global structure of solutions and their stability for nonlocal boundary value problems by using elliptic functions
  • 2018 - 2022 Geometry of partial differential equations and inverse problems
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Papers (41):
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MISC (2):
  • Kawakami Tatsuki. High order asymptotic expansion for the heat equation with a nonlinear boundary condition (Analysis on non-equilibria and nonlinear phenomena : from the evolution equations point of view). RIMS Kokyuroku. 2012. 1792. 1-17
  • Ishige Kazuhiro, Kawakami Tatsuki. On the Heat Equation in a Half-Space with a Nonlinear Boundary Condition (Variational Problems and Related Topics). RIMS Kokyuroku. 2009. 1671. 128-145
Books (1):
  • Vector Analysis
    Kyoritsu Shuppan Co., Ltd. 2019 ISBN:9784320113756
Lectures and oral presentations  (55):
  • Critical Fujita exponents for semilinear heat equations with quadratically decaying potential
    (Nonlinear Analysis Workshop 2019)
  • Critical exponent for the global existence of solutions to a semilinear heat equation with degenerate coefficients
    (New development in the theory of evolution equations: theory, phenomena and technology 2019)
  • Critical exponent for the global existence of solutions to a semilinear heat equation with degenerate coefficients
    (4th Swiss-Japanese PDE Seminar 2019)
  • Critical exponent for the global existence of solutions to a semilinear heat equation with degenerate coefficients
    (The 44th Sapporo Symposium on Partial Differential Equations 2019)
  • Critical Fujita exponents for semilinear heat equations with quadratically decaying potential
    (Workshop on Nonlinear parabolic PDEs and related fields 2019)
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Education (1):
  • - 2009 Tohoku University Graduate School of Science Department of Mathematics
Professional career (1):
  • 博士(理学) (東北大学)
Work history (6):
  • 2020/04 - 現在 Ryukoku University Applied Mathematics and Informatics Course, Faculty of Advanced Science and Technology Professor
  • 2019/04 - 2020/03 Ryukoku University Faculty of Science and Technology, Department of Applied Mathematics and Informatics
  • 2017/04 - 2019/03 Ryukoku University Faculty of Science and Technology, Department of Applied Mathematics and Informatics Associate Professor
  • 2015/04 - 2017/03 Osaka Prefecture University Department of Mathematical Sciences Associate professor
  • 2012/04 - 2015/03 Osaka Prefecture University Department of Mathematical Sciences Lecturer
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Committee career (1):
  • 2019/04 - 2021/03 日本数学会 地方区代議員
Awards (1):
  • 2020/12 - 日本数学会 函数方程式論分科会 第12回 (2020年度) 福原賞 楕円型・放物型方程式と動的境界条件の漸近解析
Association Membership(s) (1):
THE MATHEMATICAL SOCIETY OF JAPAN
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