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Interaction of oscillatory packets of water waves

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  • For surface gravity water waves we give a detailed analysis of the interaction of two NLS described wave packets with different carrier waves. We separate the internal dynamics of each wave packet from the dynamics caused by the interaction and prove the validity of a formula for the envelope shift caused by the interaction of the wave packets.
    Mathematics Subject Classification: Primary: 76B15; Secondary: 35Q55, 35A35.


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  • [1]

    A. Babin and A. Figotin., Linear superposition in nonlinear wave dynamics. Rev. Math. Phys., 18 (2006), 971-1053.


    M. Chirilus-Bruckner, G. Schneider and H. Uecker., On the interaction of NLS-described modulating pulses with different carrier waves. Math. Methods Appl. Sci., 30 2007), 1965-1978.


    M. Chirilus-Bruckner, C. Chong, G. Schneider and H. Uecker., Separation of internal and interaction dynamics for NLS-described wave packets with different carrier waves. J. Math. Anal. Appl., 347 (2008), 304-314.


    M. Chirilus-Bruckner and G. Schneider., Detection of standing pulses in periodic media by pulse interaction. J. Differential Equations, 253 (2012), 2161-2190.


    W.P. Düll, G. Schneider and C.E. Wayne., Justification of the nonlinear schrödinger equation for the evolution of gravity driven 2d surface water waves in a canal of finite depth. Archive for Rational Mechanics and Analysis, to appear 2015.


    M. Oikawa and N. Yajima., A perturbation approach to nonlinear systems. ii. interaction of nonlinear modulated waves. Journal of the Physical Society of Japan, 37 (1974), 486-496.


    R.D. Pierce and C.E. Wayne., On the validity of mean-field amplitude equations for counterpropagating wavetrains. Nonlinearity, 8 (1995), 769-779.


    G. Schneider, H. Uecker and M. Wand., Interaction of modulated pulses in nonlinear oscillator chains. Journal of Difference Eq. and Appl., 17 (2011), 279-298.


    L. Tkeshelashvili, S. Pereira and K. Busch., General theory of nonresonant wave interaction: Giant soliton shift in photonic band gap materials. Europhysics Letters, 68 (2004), 205.


    N. Totz and S. Wu., A rigorous justification of the modulation approximation to the 2D full water wave problem. Commun. Math. Phys., 310 (2012), 817-883.


    V.E. Zakharov., Stability of periodic waves of finite amplitude on the surface of a deep fluid. Sov. Phys. J. Appl. Mech. Tech. Phys, 4 (1968), 190-194.

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