Research keywords (3):
Nonlinear Partial Differential Equation
, Viscosity Solution
, Musculoskeletal System
Research theme for competitive and other funds (6):
2022 - 2027 Theory of fully nonlinear PDEs and their free boundary problems, and its applications
2020 - 2025 Regularity theory for viscosity solutions of fully nonlinear equations and its applications
2021 - 2022 偏微分方程式に関する粘性解理論及び工学との関連
2018 - 2022 準線形偏微分方程式とその自由境界問題に対する粘性解理論及びその応用
2020 - 2021 非発散型偏微分方程式の粘性解理論とロボティクスに関連する力学系の解析
2016 - 2018 準線形偏微分方程式の理論とその応用
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Papers (7):
Takahiro Kosugi, Ryuichi Sato. Existence of Global-in-Time Solutions to a System of Fully Nonlinear Parabolic Equations. Acta Applicandae Mathematicae. 2022. 181(1), Article No. 14 (24 pp)
T. Kosugi, H. Kino, M. Goto, Y. Matsutani. Stability conditions of an ODE arising in human motion and its numerical simulation. Results in Applied Mathematics. 2019. 3C, Paper No. 100063 (11 pp)
T. Kosugi, M. Goto, K. Tahara, H. Kino. Potential analysis on a 1-link-2-muscle musculoskeletal system with routing points. The 24th Robotics symposia. 2019. 24th. 252-258
H. Kino, Y. Kinjo, K. Tahara, M. Goto, T. Kosugi. Fundamental analysis of the musculoskeletal potential method considering muscle viscoelastic properties. 2019. 2P2-S08