Svadlenka Karel

シュワドレンカカレル | Svadlenka Karel

Affiliation and department：
Job title： Professor

Research field (2)： Applied mathematics and statistics , Basic mathematics

Research keywords (6)： mathematical modeling , calculus of variations , interface motion , numerical analysis , free boundary problems , nonlinear partial differential equations

Research theme for competitive and other funds (7)：

2021 - 2024 Kinetics on surface tension with junction
2019 - 2023 Analysis of interfacial network dynamics focused on cellular pattern formation
2018 - 2023 異分野融合によるキンク形成・強化の理論構築
2018 - 2023 関数空間上の汎関数に対するエネルギー最大勾配曲線の統合的研究
2018 - 2020 Theory and applications of motions of anisotropic interfacial networks

Show all

Papers (35)：

Rhudaina Z. Mohammad, Hideki Murakawa, Karel Svadlenka, Hideru Togashi. A numerical algorithm for modeling cellular rearrangements in tissue morphogenesis. Communications Biology. 2022. 5. 1
Daria Drozdenko, Michal Knapek, Martin Kružík, Kristián Máthis, Karel Švadlenka, Jan Valdman. Elastoplastic Deformations of Layered Structures. Milan Journal of Mathematics. 2022. 90. 2. 691-706
Yoshiho Akagawa, Elliott Ginder, Syota Koide, Seiro Omata, Karel Svadlenka. A Crank-Nicolson type minimization scheme for a hyperbolic free boundary problem. Discrete & Continuous Dynamical Systems - B. 2022. 27. 5. 2661-2661
Siddharth Gavhale, Karel Švadlenka. Dewetting dynamics of anisotropic particles: A level set numerical approach. Applications of Mathematics. 2021. 67. 5. 543-571
Rhudaina Mohammad, Hideki Murakawa, Karel Svadlenka, Hideru Togashi. A level set-based approach for modeling cellular rearrangements in tissue morphogenesis. Research Square. 2021

ｍore...

MISC (4)：

Svadlenka Karel, Mohammad Rhudaina Z. Approximation of motion of interface junctions using a vector-valued distance function (Regularity and Singularity for Partial Differential Equations with Conservation Laws). 2014. 1914. 16-38
Svadlenka Karel. On a volume-preserving free boundary problem (Geometric Aspect of Partial Differential Equations and Conservation Laws). RIMS Kokyuroku. 2013. 1842. 61-66
OMATA SEIRO, KAZAMA MASAKI, SVADLENKA KAREL. Discrete Morse flow for nonlocal problems (Problems in the Calculus of Variations and Related Topics). RIMS Kokyuroku. 2009. 1628. 42-47
Svadlenka Karel, OMATA Seiro, YOSHIUCHI Hideotoshi. On the construction of weak solution to a free-boundary problem modelling the vibration of film near obstacle(Dynamics of functional equations and numerical simulation). RIMS Kokyuroku. 2006. 1474. 28-36

Books (2)：

京大式サイエンスの創り方 : 狙ってもできないことがある
京都大学学術出版会 2022 ISBN:9784814004089
Variational Approach to Hyperbolic Free Boundary Problems
Springer 2022

Lectures and oral presentations (66)：

構造材料の均質化と剛性定理
(北陸応用数理研究会2023 2023)
構造材料の弾塑性有限変形の変分解析
(日本数学会2023年会 2023)
Understanding of kink-band formation by means of a rate-independent model obtained by homogenization of mille-feuille structure
(The 5th International Symposium on Long-Period Stacking/Order Structure and Mille-feuille Structure 2022)
感覚器官上皮における細胞配列ダイナミックスの数理的解明
(2022)
Variational approach to modeling of elastoplastic deformation of structured materials
(IMI Workshop II: Geometry and Algebra in Material Science III 2022)

ｍore...

Professional career (2)：

PhD (Kanazawa University)
PhD (Charles University in Prague)

Work history (1)：

2023/10 - 現在 Tokyo Metropolitan University Faculty of Science Professor

Association Membership(s) (3)：

Society for Industrial and Applied Mathematics , THE MATHEMATICAL SOCIETY OF JAPAN , THE JAPAN SOCIETY FOR INDUSTRIAL AND APPLIED MATHEMATICS

※ Researcher’s information displayed in J-GLOBAL is based on the information registered in researchmap. For details, see here.

Return to Previous Page