Motion of Curves in Hyperboloid in the Minkowski Space
スポンサーリンク
概要
- 論文の詳細を見る
A forrntrlation on the rnotion of ctrrves in hyperboloids in the 4-dimensional Minkowski spaceis presented. It incltrdes many equations integrable by uneans of' the (1 -l- 1)-dinaensionatl AKNSinverse scattering scheme. Exartaples are: the Nonlinear Schr6dinger equation of'defoctrsing type,the KdV eqtmation, the Regge-Ltrnd equation and its hyperbolic type.
- 社団法人日本物理学会の論文
- 1998-09-15
著者
-
Nakayama Kazuaki
Department Of Mathematical Sciences Faculty Of Science Shinshu University
-
Nakayama Kazuaki
Department Of Cardiovascular Medicine Okayama University Medical School
関連論文
- EFFECTS OF E-1020, A NEW CYCLIC AMP-SPECIFIC PHOSPHODIESTERASE INHIBITOR, ON CYCLIC AMP AND CYTOSOLIC FREE CALCIUIM OF CULTURED VASCULAR SMOOTH MUSCLE CELLS : The 53th Annual Scientific Session of the Japanese Circulation Society
- Curve Lengthening Equation and Its Solutions
- Motion of Discrete Curves in the Plane
- Right Partial Anomalous Pulmonary Venous Drainage Into the Coronary Sinus With an Intact Atrial Septum Diagnosed by Echocardiography
- On the Level-Set Formulation of Geometrical Models
- Reaction-Diffusion System in a Curved Space and the KPZ Equation
- Motion of Curves in the Plane
- The Motion of Surfaces
- Motion of Curves in Hyperboloid in the Minkowski Space