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Modulations of Deep Water Waves and Spectral Filtering
Author(s) -
Kliakhandler I. L.
Publication year - 2003
Publication title -
studies in applied mathematics
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.164
H-Index - 46
eISSN - 1467-9590
pISSN - 0022-2526
DOI - 10.1111/1467-9590.t01-1-00235
Subject(s) - nonlinear system , formalism (music) , instability , amplitude , modulational instability , mathematics , mathematical analysis , sideband , physics , nls , classical mechanics , quantum mechanics , art , musical , microwave , visual arts , biochemistry , chemistry , cytoplasm , nuclear localization sequence
Modulations of deep water waves are studied by a new formalism of spectral filtering. For single‐mode dynamics, spectral filtering results in computable equations, which are counterpart to the nonlinear Schrödinger (NLS) equations. An essential feature of new equations is that bandwidth limitation is decoupled from small‐amplitude assumption. The filtered equations have a substantially broader range of validity than the NLS equations, and may be viewed as intermediate between the NLS and Zakharov equations. The new single‐mode equations reproduce exactly the conditions for nonlinear four‐wave resonance (“figure 8” of Phillips [1]) even for bandwidths greater than unity. Sideband instability for uniform Stokes waves is limited to finite bandwidths only, and agrees well with exact results of McLean [2].