Solitary Waves on a Continuous Wave Background
スポンサーリンク
概要
- 論文の詳細を見る
A class of exact solutions of some nonlinear envelope equations is derived by the Hirota bilinear method. These solutions reduce to a plane wave in the far field but generally are not dark solitons. In one asymptotic regime they simplify to solitary waves on a continuous wave background.
- 社団法人日本物理学会の論文
- 1995-05-15
著者
-
Chow W.
Department Of Mathematics University Of Arizona
-
Chow W.
Department Of Biology The Chinese University Of Hong Kong
関連論文
- Molecular cloning of the major heat-stable shrimp allergen from Metapenaeus ensis
- TED-AJ03-127 THE EFFECT OF THERMAL RADIATION ON THE DYNAMICS OF FLASHOVER IN A COMPARTMENT FIRE
- TED-AJ03-128 A PRACTICAL MODEL ON FLAME SPREADING OVER MATERIALS
- Solitary Waves on a Continuous Wave Background
- Periodic Solutions of the Second Modified KdV Equation
- Theta Functions and the Dispersion Relations of Periodic Waves