Stability theorem for KdV-type equations
- 1 August 1984
- journal article
- research article
- Published by Cambridge University Press (CUP) in Journal of Plasma Physics
- Vol. 32 (2) , 263-272
- https://doi.org/10.1017/s0022377800002026
Abstract
A general KdV-type equation which covers most of the known model equations for weakly dispersive waves is investigated. First, the possible stationary localized states are discussed. When perturbed longitudinally, the perturbations can be finite and complex but should be small. In the main (second) part of the paper a necessary and sufficient stability criterion for the stationary states is derived. This is performed in two steps: A variational formulation leads to an instability region, whereas the sufficient stability criterion follows from a Liapunov functional. The stability theorem is evaluated for various models including ion-acoustic waves in plasmas and lower-hybrid cones.Keywords
This publication has 12 references indexed in Scilit:
- Stable Three-Dimensional Envelope SolitonsPhysical Review Letters, 1984
- Evolution theorem for a class of perturbed envelope soliton solutionsJournal of Mathematical Physics, 1983
- Nonlinear evolution of lower hybrid wavesPhysics of Fluids, 1979
- Langmuir solitons in magnetized plasmasPlasma Physics, 1978
- Stable approximate equations for ion-acoustic wavesPhysics of Fluids, 1977
- Stability of solitons to transverse perturbationsPlasma Physics, 1977
- Two-dimensional stability of ion-acoustic solitonsPlasma Physics, 1976
- Nonlinear Filamentation of Lower-Hybrid ConesPhysical Review Letters, 1975
- Model equations for long waves in nonlinear dispersive systemsPhilosophical Transactions of the Royal Society of London. Series A, Mathematical and Physical Sciences, 1972
- Method for Solving the Korteweg-deVries EquationPhysical Review Letters, 1967