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Boundary integral equation solutions for solitary wave generation, propagation and run-up

Kim, Sung K. / Liu, Philip L.-F. / Liggett, James A.

Abstract The boundary integral equation method (BIEM) is developed as a tool for studying two-dimensional, nonlinear water wave problems, including the phenomena of wave generation, propagation and run-up. The wave motions are described by a potential flow theory. Nonlinear free-surface boundary conditions are incorporated in the numerical formulation. Examples are given for either a solitary wave or two successive solitary waves. Special treatment is developed to trace the run-up and run-down along a shoreline. The accuracy of the present scheme is verified by comparing numerical results with experimental data of maximum run-up.

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Boundary integral equation solutions for solitary wave generation, propagation and run-up

Kim, Sung K. / Liu, Philip L.-F. / Liggett, James A.

Abstract The boundary integral equation method (BIEM) is developed as a tool for studying two-dimensional, nonlinear water wave problems, including the phenomena of wave generation, propagation and run-up. The wave motions are described by a potential flow theory. Nonlinear free-surface boundary conditions are incorporated in the numerical formulation. Examples are given for either a solitary wave or two successive solitary waves. Special treatment is developed to trace the run-up and run-down along a shoreline. The accuracy of the present scheme is verified by comparing numerical results with experimental data of maximum run-up.

Boundary integral equation solutions for solitary wave generation, propagation and run-up

Kim, Sung K. / Liu, Philip L.-F. / Liggett, James A.

Abstract The boundary integral equation method (BIEM) is developed as a tool for studying two-dimensional, nonlinear water wave problems, including the phenomena of wave generation, propagation and run-up. The wave motions are described by a potential flow theory. Nonlinear free-surface boundary conditions are incorporated in the numerical formulation. Examples are given for either a solitary wave or two successive solitary waves. Special treatment is developed to trace the run-up and run-down along a shoreline. The accuracy of the present scheme is verified by comparing numerical results with experimental data of maximum run-up.

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Title:

Boundary integral equation solutions for solitary wave generation, propagation and run-up

Contributors:

Kim, Sung K. (author) / Liu, Philip L.-F. (author) / Liggett, James A. (author)

Published in:

Coastal Engineering ; 7 ; 299-317

Publication date:

1983-05-03

Size:

19 pages

ISSN:

DOI:

https://doi.org/10.1016/0378-3839(83)90001-7

Type of media:

Article (Journal)

Type of material:

Electronic Resource

Language:

English

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