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Nonlinear self-modulation: An exactly solvable model

E. R. TracyDepartment of Physics, The College of William and Mary, Williamsburg, Virginia 23185H. H. ChenDepartment of Physics, The College of William and Mary, Williamsburg, Virginia 23185
1988en
ABI

Аннотация

The cubic Schr\"odinger equation (CSE) (${\mathrm{iu}}_{t}$+${u}_{\mathrm{xx}}$\ifmmode\pm\else\textpm\fi{}2\ensuremath{\Vert}u${\ensuremath{\Vert}}^{2}$u=0) is a generic model equation used in the study of modulational problems in one spatial dimension. The CSE is exactly solvable using inverse-scattering techniques. Periodic solutions of the focusing CSE (``+'' sign in the above equation) are also well known to be subject to modulational instabilities. This unique mixture of solvability and instability allows the development of a complete and explicit analytical theory for the long-time behavior of the instabilities. Among the results to be discussed are (i) a method for calculating the growth rates of instabilities around (spatially nonuniform) initial states, (ii) a discussion of recurrence phenomena for systems with finite spatial period, and (iii) a method for calculating the recurrence time.

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