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Department Of Applied Mathematics Faculty Of Engineering Hiroshima University | 論文
- 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
- Spectral Properties of the Spinor-Spinor Bethe-Salpeter Equation : A Speculation Based on a Simplified Model Equation
- Exact Solution to 2N-Wave Interaction
- N-Soliton Solutions of Nonlinear Network Equations Describing a Volterra System
- Bilinear,Pfaffian and Legendre Function Structures of the Tomimatsu-Sato Solutions of the Ernst Equation in General Relativity
- 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
- Bilinearization and Casorati Determinant Solution to the Non-Autonomous Discrete KdV Equation(General)
- On-off Intermittency in a Four-Dimensional Poincare Map