Soliton solutions to coupled nonlinear evolution equations modelling a third harmonic resonance in the theory of capillary-gravity waves

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Jones, M.C.W. (2016)
  • References (15)
    15 references, page 1 of 2

    t[r1a]nAsmndisesrisoonnsDig,nLailssa.kOMpt.. LMeottd. u9la(t1i9o8n4al),in4s6t8a-b4i7li0ty. of coherent optical fibre IPT R

    [2] Barakat R, Houston A. Nonlinear periodic capillary-gravity waves on a fluid of C

    finite depth. J. Geophys. Res. 73 (1968), 6545-55. S

    [3] Benney DJ, Zhou YF. Instability of three dimensional wUaves in shear flows. Stud. App. Math. 81 (1989), 41-55. N

    [4] Bohr N. in Collected Works, Vol. 1. pp 67-78 ANorth-Holland, Amsterdam, 1972.

    [5] Chen B, Saffman PG. Steady gravity-cMapillary waves on deep water-1. weakly nonlinear waves. Stud. App. Math. 60 (1979), 183-210. D E

    [6] Dias F, Bridges TJ. The third-harmonic resonance for capillary-gravity waves with O(2) spatial symmetry. StuTd.App. Math. 82 (1990),13-35.

    [7] Harrison WJ. The inPfluence of viscosity and capillarity on waves of finite amplitude. Proc. LEond. Math. Soc. 7 (1909), 107-120. C

    [8] Hasegawa A. Theory and computer experiments on self-trapping C

    instability of plasma cyclotron waves. Phys. Fluids. 15 (1971), 870-881. A

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