Zakharov–Schulman system
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In mathematics, the Zakharov-Schulman system is a system of nonlinear partial differential equations introduced in (Zakharov & Schulman 1980) to describe the interactions of small amplitude, high frequency waves with acoustic waves. The equations are
- iut + L1u = φu
- L2φ = L3( | u | 2)
where L1, L1, L1, are constant coefficient differential operators.
[edit] References
- V.E. Zakharov, E.I. Schulman, Degenerated dispersion laws, motion invariant and kinetic equations, Physica 1D (1980), 185-250.