Unsteady evolution of localized unidirectional deep-water wave groups
Author(s)
Cousins, Will; Sapsis, Themistoklis
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We study the evolution of localized wave groups in unidirectional water wave envelope equations [the nonlinear Schrodinger (NLSE) and the modified NLSE (MNLSE)]. These localizations of energy can lead to disastrous extreme responses (rogue waves). We analytically quantify the role of such spatial localization, introducing a technique to reduce the underlying partial differential equation dynamics to a simple ordinary differential equation for the wave packet amplitude. We use this reduced model to show how the scale-invariant symmetries of the NLSE break down when the additional terms in the MNLSE are included, inducing a critical scale for the occurrence of extreme waves.
Date issued
2015-06Department
Massachusetts Institute of Technology. Department of Mechanical EngineeringJournal
Physical Review E
Publisher
American Physical Society
Citation
Cousins, Will, and Themistoklis P. Sapsis. “Unsteady Evolution of Localized Unidirectional Deep-Water Wave Groups.” Phys. Rev. E 91, no. 6 (June 2015). © 2015 American Physical Society
Version: Final published version
ISSN
1539-3755
1550-2376