Self-trapping of traveling-wave pulses in binary mixture convection
- 20 January 1992
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 68 (3) , 301-304
- https://doi.org/10.1103/physrevlett.68.301
Abstract
Localized traveling-wave trains (LTW) have been observed in various experiments on binary mixture convection. I show that the commonly used complex Ginzburg-Landau equations, which fail to describe a characteristic feature of LTW—their extremely slow drift—break down in these systems and I derive a new set of coupled equations which takes into account the slow dynamics of the concentration field. It possesses slow LTW over a wide range of parameters. In addition, it supports LTW even if it has only real coefficients and is therefore far from the nonlinear Schrödinger limit.Keywords
This publication has 25 references indexed in Scilit:
- Localized traveling-wave convection in binary-fluid mixturesPhysical Review Letters, 1991
- Hopf bifurcation with broken circular symmetryNonlinearity, 1991
- Long time scales in traveling wave convection patternsPhysics Letters A, 1990
- Localized traveling-wave states in binary-fluid convectionPhysical Review Letters, 1990
- Structure of nonlinear traveling-wave states in finite geometriesPhysical Review A, 1988
- Localized, Time-Dependent State in the Convection of a Nematic Liquid CrystalPhysical Review Letters, 1988
- Traveling-wave convection in an annulusPhysical Review Letters, 1988
- Traveling waves and spatial variation in the convection of a binary mixturePhysical Review A, 1987
- Multistability and confined traveling-wave patterns in a convecting binary mixturePhysical Review A, 1987
- Traveling and Standing Waves in Binary-Fluid Convection in Finite GeometriesPhysical Review Letters, 1986