Rchr
J-GLOBAL ID:202101002948002368
Update date: Apr. 04, 2024
Kajiwara Naoto
カジワラ ナオト | Kajiwara Naoto
Affiliation and department:
Other affiliations (1):
Research field (1):
Mathematical analysis
Research keywords (4):
Maximal Regularity
, Analytic Semigroup
, Partial Differential Equations
, Parabolic Evolution Equations
Research theme for competitive and other funds (2):
- 2020 - 2024 Well-posedness for the equation on electrohydrodynamics
- 2019 - 2021 Mathematical analysis of fluids with electrical effects
Papers (8):
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Naoto Kajiwara, Aiki Matsui. Maximal regularity for the heat equation with various boundary conditions in an infinite layer. SUT Journal of Mathematics. 2023. 59. 2
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Naoto Kajiwara. Higher regularity for parabolic equations based on maximal L_p-L_q spaces. Advances in Differential Equations and Control Processes. 2022. 27. 55-71
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Ken Furukawa, Naoto Kajiwara. Maximal L-p-L-q regularity for the quasi-steady elliptic problems. JOURNAL OF EVOLUTION EQUATIONS. 2021. 21. 2. 1601-1625
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Matthias Hieber, Naoto Kajiwara, Klaus Kress, Patrick Tolksdorf. The periodic version of the Da Prato-Grisvard theorem and applications to the bidomain equations with FitzHugh-Nagumo transport. ANNALI DI MATEMATICA PURA ED APPLICATA. 2020. 199. 6. 2435-2457
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Yoshikazu Giga, Naoto Kajiwara, Klaus Kress. Strong time-periodic solutions to the bidomain equations with arbitrary large forces. NONLINEAR ANALYSIS-REAL WORLD APPLICATIONS. 2019. 47. 398-413
more...
MISC (10):
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Maximal regularity for the Stokes equations with Dirichlet-Neumann boundary condition in an infinite layer. preprint. 2023
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R-bondedness for an integral operator in the half space and its application to the Stokes problems. RIMS Kokyuroku. 2023
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Maximal Lp-Lq regularity for the heat equation with various boundary conditions in the half space. RIMS Kokyuroku. 2023
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Naoto Kajiwara. Solution formula for generalized two-phase Stokes equations and its applications to maximal regularity; model problems. arXiv. 2022
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Naoto Kajiwara. Maximal L_p-L_q regularity for the Stokes equations with various boundary conditions. arXiv. 2022
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Lectures and oral presentations (47):
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Maximal regularity for the Stokes equations with various boundary conditions
(Workshop on Analysis in Kagurazaka 2024 2024)
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Maximal regularity for the Stokes equations with various boundary conditions
(2024)
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Resolvent estimate for the heat equation in an infinite layer with various boundary conditions
(2023)
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Resolvent estimate for the heat equation in an infinite layer with various boundary conditions
(2023)
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Resolvent estimate for the heat equation in an infinite layer with various boundary conditions
(2023)
more...
Education (4):
- 2016 - 2019 The University of Tokyo Graduate School of Mathematical Sciences
- 2016 - 2018 Waseda University Graduate School of Fundamental Science and Engineering
- 2014 - 2016 The University of Tokyo Graduate School of Mathematical Sciences
- 2010 - 2014 Tokyo University of Science Faculty of Science and Technology Mathematics
Professional career (1):
- Ph.D (Mathematical Science) (The university of Tokyo)
Work history (3):
- 2021/04 - 現在 Gifu University Faculty of Engineering Department of Electrical, Electronic and Computer Engineering
- 2019/04 - 2021/03 Tokyo University of Science Faculty of Science and Technology Mathematics
- 2016/04 - 2019/03 The University of Tokyo Graduate School of Mathematical Sciences
Awards (2):
- 2019/03 - The University of Tokyo, Mathematical Science Deans award
- 2015/11 - Mathematical Society of Japan Research exchange meeting Best poster presentation
Association Membership(s) (1):
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