220 件ヒット (0.018秒):
非線形偏微分方程式をはじめとする非線形問題の研究では変分法の考え方が広く用いられている.この講義では非線形問題の研究で用いられるさまざまな変分的手法について講義する.さらに非線形偏微分方程式などへの応用についても解説したい.
Ideas of variational methods are widely exploited in the studies of various nonlinear problems such as nonlinear Partial Differential Equations (PDEs for short). This course is concerned with a variety of variational methods for nonlinear problems. Moreover, applications to nonlinear PDEs are also discussed.
非線形偏微分方程式をはじめとする非線形問題の研究では変分法の考え方が広く用いられている.この講義では非線形問題の研究で用いられるさまざまな変分的手法について講義する.さらに非線形偏微分方程式などへの応用についても解説したい.
Ideas of variational methods are widely exploited in the studies of various nonlinear problems such as nonlinear Partial Differential Equations (PDEs for short). This course is concerned with a variety of variational methods for nonlinear problems. Moreover, applications to nonlinear PDEs are also discussed.
非線形偏微分方程式をはじめとする非線形問題の研究では変分法の考え方が広く用いられている.この講義では非線形問題の研究で用いられるさまざまな変分的手法について講義する.さらに非線形偏微分方程式などへの応用についても解説したい.
Ideas of variational methods are widely exploited in the studies of various nonlinear problems such as nonlinear Partial Differential Equations (PDEs for short). This course is concerned with a variety of variational methods for nonlinear problems. Moreover, applications to nonlinear PDEs are also discussed.