A mathematical model for long waves generated by wavemakers in non-linear dispersive systems

J. L. Bona; P. J. Bryant

doi:10.1017/S0305004100076945

Extract

An initial-boundary-value problem for the equation

is considered for x, t ≥ 0. This system is a model for long water waves of small but finite amplitude, generated in a uniform open channel by a wavemaker at one end. It is shown that, in contrast to an alternative, more familiar model using the Korteweg–deVries equation, the solution of (a) has good mathematical properties: in particular, the problem is well set in Hadamard's classical sense that solutions corresponding to given initial data exist, are unique, and depend continuously on the specified data.

References

REFERENCES

(1)Benjamin, T. B., Bona, J. L. & Mahony, J. J.Model equations for long waves in nonlinear dispersive systems. Philos. Trans. Roy. Soc. London, Ser. A 272 (1972), 47.Google Scholar

(2)Korteweg, D. J. & De Vries, G.On the change in form of long waves advancing in a rectangular channel, and on a new type of long stationary waves. Philos. Mag. (5) 39 (1895), 422.CrossRef Google Scholar

(3)Lions, J. L. & Magenes, E.Problèmes aux limites non homogènes et applications, vol. 1 (Paris, Dunod, 1968).Google Scholar

(4)Treves, F.Topological vector spaces, distributions and kernels (New York, Academic Press, 1967).Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Bryant, P. J. 1973. Periodic waves in shallow water. Journal of Fluid Mechanics, Vol. 59, Issue. 4, p. 625.

An Ton, Bui 1976. Nonlinear evolution equations of Sobolev-Galpern type. Mathematische Zeitschrift, Vol. 151, Issue. 3, p. 219.

Calvert, Bruce 1976. The equation A(t, u(t))′ + B(t, u(t)) = 0. Mathematical Proceedings of the Cambridge Philosophical Society, Vol. 79, Issue. 3, p. 545.

1976. Singular and Degenerate Cauchy Problems. Vol. 127, Issue. , p. 275.

Ewing, Richard E. 1978. Time-Stepping Galerkin Methods for Nonlinear Sobolev Partial Differential Equations. SIAM Journal on Numerical Analysis, Vol. 15, Issue. 6, p. 1125.

Showalter, R.E. 1978. Sobolev equations for nonlinear dispersive systems†. Applicable Analysis, Vol. 7, Issue. 4, p. 297.

Oskolkov, A. P. 1978. Construction of characteristic functions for the system of Navier-Stokes-Voigt equations and the BBM equation. Journal of Soviet Mathematics, Vol. 10, Issue. 1, p. 95.

Goldstein, Jerome A. and Wichnoski, Bruno J. 1980. On the Benjamin-Bona-Mahony equation in higher dimensions. Nonlinear Analysis: Theory, Methods & Applications, Vol. 4, Issue. 4, p. 665.

Yu-lin, Zhou 1983. Nonlinear Partial Differential Equations in Applied Science; Proceedings of The U.S.-Japan Seminar, Tokyo, 1982. Vol. 81, Issue. , p. 435.

Bona, Jerry and Winther, Ragnar 1983. The Korteweg–de Vries Equation, Posed in a Quarter-Plane. SIAM Journal on Mathematical Analysis, Vol. 14, Issue. 6, p. 1056.

Oharu, Shinnosuke and Takahashi, Tadayasu 1984. Recent Topics in Nonlinear PDE. Vol. 98, Issue. , p. 125.

Oharu, Shinnosuke and Takahashi, Tadayasu 1986. On nonlinear evolution operators associated with some nonlinear dispersive equations. Proceedings of the American Mathematical Society, Vol. 97, Issue. 1, p. 139.

Albert, J. P. and Bona, J. L. 1991. Comparisons between model equations for long waves. Journal of Nonlinear Science, Vol. 1, Issue. 3, p. 345.

Jain, P. C. Shankar, Rama and Singh, T. V. 1993. Numerical solution of regularized long‐wave equation. Communications in Numerical Methods in Engineering, Vol. 9, Issue. 7, p. 579.

Wang, Bixiang and Yang, Wanli 1997. Finite-dimensional behaviour for the Benjamin - Bona - Mahony equation. Journal of Physics A: Mathematical and General, Vol. 30, Issue. 13, p. 4877.

Wang, Bixiang 1997. Attractors and Approximate Inertial Manifolds for the Generalized Benjamin-Bona-Mahony Equation. Mathematical Methods in the Applied Sciences, Vol. 20, Issue. 3, p. 189.

Wang, Bixiang 1998. Regularity of attractors for the Benjamin-Bona-Mahony equation. Journal of Physics A: Mathematical and General, Vol. 31, Issue. 37, p. 7635.

Bona, Jerry L. and Wu, Jiahong 2000. Zero-Dissipation Limit for Nonlinear Waves. ESAIM: Mathematical Modelling and Numerical Analysis, Vol. 34, Issue. 2, p. 275.

Bona, Jerry L. Sun, Shu Ming and Zhang, Bing-Yu 2003. A Nonhomogeneous Boundary-Value Problem for the Korteweg–de Vries Equation Posed on a Finite Domain. Communications in Partial Differential Equations, Vol. 28, Issue. 7-8, p. 1391.

Dagˇ, İdris DoĞan, AbdÜlkadir and Saka, BÜlent 2003. B-Spline Collocation Methods For Numerical Solutions Of The Rlw Equation. International Journal of Computer Mathematics, Vol. 80, Issue. 6, p. 743.

Download full list

Article contents

A mathematical model for long waves generated by wavemakers in non-linear dispersive systems

Extract

Access options

References

REFERENCES

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

A mathematical model for long waves generated by wavemakers in non-linear dispersive systems

Extract

Access options

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests