4.7 Article

On certain properties of the compact Zakharov equation

Journal

JOURNAL OF FLUID MECHANICS
Volume 748, Issue -, Pages 692-711

Publisher

CAMBRIDGE UNIV PRESS
DOI: 10.1017/jfm.2014.192

Keywords

instability; waves/free-surface flows

Funding

  1. National Ocean Partnership Program, through the US Office of Naval Research [BAA 09-012]

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Long-time evolution of a weakly perturbed wavetrain near the modulational instability (MI) threshold is examined within the framework of the compact Zakharov equation for unidirectional deep-water waves (Dyachenko and Zakharov, JETP Lett., vol. 93, 2011, pp. 701-705). Multiple-scale solutions reveal that a perturbation to a slightly unstable uniform wavetrain of steepness mu slowly evolves according to a nonlinear Schrodinger equation (NLS). In particular, for small carrier wave steepness mu < mu(1) approximate to 0.27 the perturbation dynamics is of focusing type and the long-time behaviour is characterized by the Fermi-Pasta-Ulam recurrence, the signature of breather interactions. However, the amplitude of breathers and their likelihood of occurrence tend to diminish as mu increases while the Benjamin-Feir index (BFI) decreases and becomes nil at mu(1). This indicates that homoclinic orbits persist only for small values of wave steepness mu << mu(1), in agreement with recent experimental and numerical observations of breathers. When the compact Zakharov equation is beyond its nominal range of validity, i.e. for mu > mu(1,) predictions seem to foreshadow a dynamical trend to wave breaking. In particular, the perturbation dynamics becomes of defocusing type, and nonlinearities tend to stabilize a linearly unstable wavetrain as the Fermi-Pasta-Ulam recurrence is suppressed. mu = mu(c) approximate to 0.577, subharmonic perturbations restabilize and superharmonic instability appears, possibly indicating that wave dynamical behaviour changes at large steepness, in qualitative agreement with the numerical simulations of Longuet-Higgins and Cokelet (Proc. R. Soc. Lond. A, vol. 364, 1978, pp. 1-28) for steep waves. Indeed, for mu > mu(1) a multiple-scale perturbation analysis reveals that a weak narrowband perturbation to a uniform wavetrain evolves in accord with a modified Korteweg-de Vries/Camassa-Holm type equation, again implying a possible mechanism conducive to wave breaking.

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