Results 231 to 240 of about 94,822 (286)
Dynamical description and analytical study of traveling wave solutions for generalized Benjamin-Ono equation. [PDF]
Sci RepHassaballa AA +5 more
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Dynamics of soliton propagation: bifurcation, chaos, and quantitative insights into the modified Camassa-Holm equation. [PDF]
Sci RepAlam MN +5 more
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Nonlinear dynamics of self-sustaining waves in anisotropic media. [PDF]
Sci RepKhater MMA, Alfalqi SH, Vokhmintsev A.
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Some novel optical pulses in hydrodynamical nonlinear complex equation using M-truncated fractional derivative. [PDF]
Sci RepIlhan E +4 more
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Solitary Nodule in the Hard Palate
Oral Diseases, EarlyView.
Sara Lia Gonçalves de Lima +6 more
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SIAM Journal on Applied Mathematics, 1979
The interactions of nonperiodic solitary waves are numerically investigated for the nonlinear Klein–Gordon equation. It is found that the collisions are generally inelastic. Special solutions to the sine-Gordon equation are discussed.
Ablowitz, M. J. +2 more
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The interactions of nonperiodic solitary waves are numerically investigated for the nonlinear Klein–Gordon equation. It is found that the collisions are generally inelastic. Special solutions to the sine-Gordon equation are discussed.
Ablowitz, M. J. +2 more
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Studies in Applied Mathematics, 1992
The expansion procedure introduced by Benney (1966) for weakly nonlinear, planar shallow‐water waves is used to provide an alternative derivation of the more general results of Benjamin (1966) for shallow fluid layers possessing arbitrary vertical stratification and horizontal shear.
Weidman, P. D., Velarde, M. G.
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The expansion procedure introduced by Benney (1966) for weakly nonlinear, planar shallow‐water waves is used to provide an alternative derivation of the more general results of Benjamin (1966) for shallow fluid layers possessing arbitrary vertical stratification and horizontal shear.
Weidman, P. D., Velarde, M. G.
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Physica Scripta, 1975
We show that the hydrodynamic equations which govern the propagation of acoustic gravity waves can have shock-like solutions.
Dysthe, K. B., Stenflo, L.
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We show that the hydrodynamic equations which govern the propagation of acoustic gravity waves can have shock-like solutions.
Dysthe, K. B., Stenflo, L.
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SOLITARY WAVE INTERACTIONS WITH CONTINUOUS WAVES
International Journal of Bifurcation and Chaos, 2006Solitary wave propagation under interaction with continuous waves is studied in the context of the Nonlinear Schrödinger Equation. An analytical approach, based on the conserved quantities of the wave evolution, is used to study transverse velocity variations for the case of nonzero transverse wavenumber difference between the solitary and continuous ...
Yannis Kominis, K. Hizanidis
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Waves generated by collisions of solitary waves
Physical Review A, 1987The small-amplitude, long-wavelength perturbation expansion of the water-wave equation has been extended to the fourth order of approximation for overtaking collisions of solitary waves. It is found that collisions of solitary waves generate, besides the dispersive wave train reported by us earlier [Q.-s. Zou and C.-H. Su, Phys. Fluids 20, 2113 (1986)],
, Su, , Zou
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