Wave-Schrodinger systems: Difference between revisions
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A '''wave-Schrodinger system''' is any coupled system of a [[wave equations|nonlinear wave equation]] and a [[Schrodinger | A '''wave-Schrodinger system''' is any coupled system of a [[wave equations|nonlinear wave equation]] and a [[Schrodinger equations|nonlinear Schrodinger equation]]. The main examples are: | ||
* The [[ | * The [[Ishimori system]] | ||
* The [[Maxwell-Schrodinger system]] | |||
* The [[ | |||
* The [[Yukawa-type system]] | * The [[Yukawa-type system]] | ||
* The [[ | * The [[Zakharov system]] ([[Zakharov system on R|on R]], [[Zakharov system on T|on T]], [[Zakharov system on R^2|on R^2]], or [[Zakharov system on R^3|on R^3]]) | ||
* The [[Zakharov- | ** The [[magnetic Zakharov equation]] (formed by adding a magnetic field to the Zakharov system) | ||
* | ** The [[Klein-Gordon-Zakharov system]] (formed by adding a mass to the Zakharov system) | ||
* [[Zakharov-Schulman system]]s (including the [[Davey-Stewartson system]] as a special case) | |||
[[Category:Equations]] | [[Category:Equations]] | ||
Latest revision as of 20:24, 9 August 2006
A wave-Schrodinger system is any coupled system of a nonlinear wave equation and a nonlinear Schrodinger equation. The main examples are:
- The Ishimori system
- The Maxwell-Schrodinger system
- The Yukawa-type system
- The Zakharov system (on R, on T, on R^2, or on R^3)
- The magnetic Zakharov equation (formed by adding a magnetic field to the Zakharov system)
- The Klein-Gordon-Zakharov system (formed by adding a mass to the Zakharov system)
- Zakharov-Schulman systems (including the Davey-Stewartson system as a special case)
