Solutions of the Classical Boussinesq Equation and the Spherical Boussinesq Equation:The Wronskian Technique
スポンサーリンク
概要
- 論文の詳細を見る
The rational solutions to the classical Boussinesq equation conjectured byNakamura and the author are proved to be true by the'use of the Wronskian techni-que developed by Freeman and Nimmo. It is also found that a non-auto Bicklundtransformation between a rational solution of the spherical Boussinesq equation witha time-dependent velocity term is nothing but the similarity form of the classicalBoussinesq equation.
- 社団法人日本物理学会の論文
- 1986-07-15
著者
関連論文
- Conserved Quantities of a Class of Nonlinear Difference-Difference Equations
- Ultradiscrete KdV Equation
- Casorati and Discrete Gram Type Determinant Representations of Solutions to the Discrete KP Hierarchy
- Note on "New Coupled Integrable Dispersionless Equations"
- Pfaffian Representation of Solutions to the Discrete BKP Hierarchy in Bilinear Form
- Discretization of the Lagrange Top : General Physics
- Ultradiscrete Soliton Solution of Permanent Type(General)
- Two-Dimensional Toda Lattice Equations
- Soliton Solutions of the Mel'nikov Equations
- Discretization of the Euler Top : General Physics
- Discretization of the Potential Modified KdV Equation
- Wronskian Structures of Solutions for Soliton Equations
- Solutios of the Kadomtsev-Petviashvili Equation and the Two-Dimensional Toda Equations
- Second Modified KdV Equation and Its Exact Multi-Soliton Solution
- A Discrete KdV Equation and Its Casorati Determinant Solution
- Exact Solutions of the Cylindrical Toda Molecule Equation
- The Backlund and Inverse Scattering Transform of the K-dV Equation with Nonuniformities
- Solutions of the Classical Boussinesq Equation and the Spherical Boussinesq Equation:The Wronskian Technique
- Bilinearization of Soliton Equations
- A New Example of Explode-Decay Solitary Waves in One-Dimension
- "Molecule Solutions"of Coupled Modefied KdV Equations
- Classical Boussinesq Equation is a Reduction of the Modified KP Equation
- Soliton Solutions of a Coupled Derivative Modified KdV Equations : General Physics
- A Coupled KdV Equation is One Case of the Four-Reduction of the KP Hierarchy
- Resonance of Solitons in One Dimension
- N-Soliton Solution of the K-bV Equation with Loss and Nonuniformity Terms
- Chopping Phenomenon of a Nonlinear System
- Exact Solution to 2N-Wave Interaction
- N-Soliton Solutions of Nonlinear Network Equations Describing a Volterra System
- An Exact Solution to "Simple Harmonic Generation"
- Nonlinear Partial Difference Equations.IV.Backlund Transformation for the Discrete-Time Toda Equation
- A Variety of Nonlinear Network Equations Generated from the Backlund Transformation for the Toda Lattice
- Nonlinear Evolution Equations Generated from the Backlund Transformation for the Toda Lattice
- Nonlinear Evolution Equations Generated from the Backlund Transformation for the Boussinesq Equation
- Hierarchies of Coupled Soliton Equations. I
- Discrete Analogue of a Generalized Toda Equation
- A Direct Approach to Multi-Periodic Wave Solutions to Nonlinear Evolution Equations
- A Functional Integral Representation of the Soliton Solution
- Nonlinear Partial Difference Equations. : I. A Difference Analogue of the Korteweg-de Vries Equation
- Discrete Two-Dimensional Toda Molecule Equation
- Nonlinear Transformations among Differential-Difference Equations That Exhibit Solitons
- N-Soliton Solutions of Model Equations for Shallow Water Waves
- Nonlinear Partial Difference Equations. V. Nonlinear Equations Reducible to Linear Equations
- Soliton Solutions to the BKP Equations.II.The Integral Equation
- Soliton Solutions to the BKP Equations.I.the Pfaffian technique