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Experiments and analyses of upstream-advancing solitary waves generated by moving disturbances

Published online by Cambridge University Press:  26 April 2006

Seung-Joon Lee ,
George T. Yates  and
T. Yaotsu Wu
Seung-Joon Lee
Affiliation:
Engineering Science, California Institute of Technology, Pasadena, CA 91125, USA Current address: Chungnam National University, Dept. Naval Architecture and Ocean Engineering, Daeduk Science Town 300-31 Korea.
George T. Yates
Affiliation:
Engineering Science, California Institute of Technology, Pasadena, CA 91125, USA
T. Yaotsu Wu
Affiliation:
Engineering Science, California Institute of Technology, Pasadena, CA 91125, USA
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Abstract

In this joint theoretical, numerical and experimental study, we investigate the phenomenon of forced generation of nonlinear waves by disturbances moving steadily with a transcritical velocity through a layer of shallow water. The plane motion considered here is modelled by the generalized Boussinesq equations and the forced Korteweg-de Vries (fKdV) equation, both of which admit two types of forcing agencies in the form of an external surface pressure and a bottom topography. Numerical results are obtained using both theoretical models for the two types of forcings. These results illustrate that within a transcritical speed range, a succession of solitary waves are generated, periodically and indefinitely, to form a procession advancing upstream of the disturbance, while a train of weakly nonlinear and weakly dispersive waves develops downstream of an ever elongating stretch of a uniformly depressed water surface immediately behind the disturbance. This is a beautiful example showing that the response of a dynamic system to steady forcing need not asymptotically tend to a steady state, but can be conspicuously periodic, after an impulsive start, when the system is being forced at resonance.

A series of laboratory experiments was conducted with a cambered bottom topography impulsively started from rest to a constant transcritical velocity U, the corresponding depth Froude number F = U/(gh0)½ (g being the gravitational constant and h0 the original uniform water depth) being nearly the critical value of unity. For the two types of forcing, the generalized Boussinesq model indicates that the surface pressure can be more effective in generating the precursor solitary waves than the submerged topography of the same normalized spatial distribution. However, according to the fKdV model, these two types of forcing are entirely equivalent. Besides these and some other rather refined differences, a broad agreement is found between theory and experiment, both in respect of the amplitudes and phases of the waves generated, when the speed is nearly critical (0.9 < F < 1.1) and when the forcing is sufficiently weak (the topography-height to water-depth ratio less than 0.15) to avoid breaking. Experimentally, wave breaking was observed to occur in the precursor solitary waves at low supercritical speeds (about 1.1 < F < 1.2) and in the first few trailing waves at high subcritical speeds (about 0.8 < F < 0.9), when sufficiently forced. For still lower subcritical speeds, the trailing waves behaved more like sinusoidal waves as found in the classical case and the forward-running solitary waves, while still experimentally discernible and numerically predicted for 0.6 > F > 0.2, finally disappear at F ≈ 0.2. In the other direction, as the Froude number is increased beyond F ≈ 1.2, the precursor soliton phenomenon was found also to evanesce as no finite-amplitude solitary waves can outrun, nor can any two-dimensional waves continue to follow, the rapidly moving disturbance. In this supercritical range and for asymptotically large times, all the effects remain only local to the disturbance. Thus, the criterion of the fascinating phenomenon of the generation of precursor solitons is ascertained.

Type
Research Article
Information
Journal of Fluid Mechanics , Volume 199 , February 1989 , pp. 569 - 593
Copyright
© 1989 Cambridge University Press

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References

Akylas, T. R.: 1984 On the excitation of long nonlinear water waves by a moving pressure distribution. J. Fluid Mech. 141, 455466.Google Scholar
Benjamin, T. B., Bona, J. L. & Mahony, J. J., 1972 Model equations for long waves in nonlinear dispersive systems. Phil. Trans. R. Soc. Lond. A 272, 4778.Google Scholar
Bullough, R. K. & Caudrey, P. J., 1980 Solitons. In Topics in Current Physics, Vol. 17. Springer.
Cole, S. L.: 1985 Transient waves produced by flow past a bump. Wave Motion 7, 579587.Google Scholar
Daily, J. W. & Stephan, S. C., 1952 The solitary wave - its celerity, profile, internal velocities and amplitude attenuation. Hydro. Lab., Dept. Civil Engr., Massachusetts Institute of Technology Tech. Rep. 8.Google Scholar
Dodd, R. K., Eilbeck, J. C., Gibbon, J. D. & Morris, H. S., 1982 Solitons and Nonlinear Wave Equations. Academic.
Ertekin, R. C.: 1984 Soliton generation by moving disturbances in shallow water: Theory, computation and experiments. Ph.D. thesis, University of Calif., Berkeley, CA.
Ertekin, R. C., Webster, W. C. & Wehausen, J. V., 1984 Ship-generated solitons. In Proc. 15th Symp. on Naval Hydrodynamics, pp. 347364. Washington, DC: National Academy Press.
Ertekin, R. C., Webster, W. C. & Wehausen, J. V., 1986 Waves caused by a moving disturbance in a shallow channel of finite width. J. Fluid Mech. 169, 275292.Google Scholar
Green, A. E. & Naghdi, P. M., 1976a A derivation of equations for wave propagation in water of variable depth. J. Fluid Mech. 78, 237246.Google Scholar
Green, A. E. & Naghdi, P. M., 1976b Directed fluid sheets. Proc. R. Soc. Lond. A 347, 447473.Google Scholar
Grimshaw, R. H. J. & Smyth, N. F. 1986 Resonant flow of a stratified fluid over topography. J. Fluid Mech. 169, 429464.Google Scholar
Katsis, C. & Akylas, T. R., 1987 On the excitation of long nonlinear water waves by a moving pressure distribution. Part 2. Three-dimensional effects J. Fluid Mech. 177, 4965.Google Scholar
Lamb, H.: 1932 Hydrodynamics. Cambridge University Press.
Lee, S. J.: 1985 Generation of long water waves by moving disturbances. Ph.D. thesis, California Institute of Technology, Pasadena, CA.
Lee, S. J.: 1987 Generation of long water waves by moving submerged bodies. J. Soc. Naval Arch. Korea 24–2, 5561.Google Scholar
Lepelletier, T. G.: 1981 Tsunamis-harbor oscillations induced by nonlinear transient long waves. Ph.D. thesis, California Institute of Technology, Pasadena, CA.
Lepelletier, T. G. & Raichlen, F., 1987 Harbour oscillations induced by nonlinear transient long waves. ASCE J. Waterway, Port, Coastal and Ocean Engng 113–4, 381400.Google Scholar
Mei, C. C.: 1986 Radiation of solitons by slender bodies advancing in a shallow channel. J. Fluid Mech. 162, 5367.Google Scholar
Melville, W. K. & Helfrich, K. R., 1987 Transcritical two-layer flow over topography. J. Fluid Mech. 178, 3152.Google Scholar
Miles, J. W.: 1980 Solitary waves. Ann. Rev. Fluid Mech. 12, 1143.Google Scholar
Rebbi, C. & Soliani, G., 1984 Solitons and Particles. World Scientific.
Schember, H. R.: 1982 A new model for three-dimensional nonlinear dispersive long waves. Ph.D. thesis, California Institute of Technology, Pasadena, CA.
Schlichting, H.: 1979 Boundary Layer Theory, 7th edn. McGraw-Hill.
Shields, J. J.: 1986 A direct theory for waves approaching a beach. Ph.D. thesis, University of California at Berkeley, Berkeley, CA.
Smyth, N. F.: 1987 Modulation theory solution for resonant flow over topography. Proc. R. Soc. Lond. A A409, 7997.Google Scholar
Whitham, G. B.: 1974 Linear and Nonlinear Waves. Wiley.
Wu, D. M. & Wu, T. Y., 1982 Three-dimensional nonlinear long waves due to moving surface pressure. In Proc. 14th Symp. on Naval Hydrodynamics, pp. 103125. Washington, DC: National Academy Press.
Wu, D. M. & Wu, T. Y., 1987 Precursor solitons generated by three-dimensional disturbances moving in a channel. In Non-linear Water Waves. IUTAM Symposium, Tokyo, Japan 1987 (ed. K. Horikawa & H. Maruo), pp. 6975. Springer.
Wu, T. Y.: 1979 On tsunamis propagation - evaluation of existing models. In Tsunamis - Proceedings of the National Science Foundation Workshop (ed. L. S. Hwang & Y. K. Lee), pp. 110149. Pasadena, CA: Tetra Tech. Inc.
Wu, T. Y.: 1981 Long waves in ocean and coastal waters. J. Eng. Mech. Div. ASCE 107, 501522.Google Scholar
Wu, T. Y.: 1987 Generation of upstream-advancing solitons by moving disturbances. J. Fluid Mech. 184, 7599.Google Scholar
Zabusky, N. J. & Kruskal, M. D., 1965 Interaction of ‘solitons’ in a collisionless plasma and the recurrence of initial states. Phys. Rev. Lett. 15, 240243.Google Scholar
Zhu, J.: 1986 Internal solitons generated by moving disturbances. Ph.D. thesis, California Institute of Technology, Pasadena, CA.
Zhu, J., Wu, T. Y. & Yates, G. T., 1986 Generation of internal runaway solitons by moving disturbances. In Proc. 16th Symp. on Naval Hydrodynamics (ed. W. C. Webster), pp. 186198. Washington, DC: National Academy Press.
Zhu, J., Wu, T. Y. & Yates, G. T., 1987 Internal solitary waves generated by moving disturbances. In Stratified Flows (Third Intl Symp. on Stratified Flows; Feb. 3–5, 1987, Pasadena, CA) (ed. E. J. List & G. H. Jirka). D. Reidel (in press).