Edge Waves Over a Shelf
The problem considered in this paper is the derivation of properties of edge waves travelling along a submerged horizontal shelf. The problem is formulated within the framework of the linearized theory of water waves and Havelock expansions of water wave potentials are used in the mathematical analy...
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| Format: | Article |
| Language: | English |
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Sciendo
2019-06-01
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| Series: | International Journal of Applied Mechanics and Engineering |
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| Online Access: | https://doi.org/10.2478/ijame-2019-0028 |
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doaj-bba8c199855848e980f8aa7c752b713f2021-09-05T21:02:02ZengSciendoInternational Journal of Applied Mechanics and Engineering1734-44922353-90032019-06-0124245346010.2478/ijame-2019-0028ijame-2019-0028Edge Waves Over a ShelfDolai P.0Dolai D.P.1Department of Mathematics, Prasannadeb Women’s College, Jalpaiguri-735101, West Bengal, IndiaRiver Research Institute, West Bengal, Haringhata Central Laboratory, Mohanpur, Nadia, Pin-741246, IndiaThe problem considered in this paper is the derivation of properties of edge waves travelling along a submerged horizontal shelf. The problem is formulated within the framework of the linearized theory of water waves and Havelock expansions of water wave potentials are used in the mathematical analysis to obtain the dispersion relation for edge waves in terms of an integral. Appropriate multi-term Galerkin approximations involving ultra spherical Gegenbauer polynomials are utilized to obtain a very accurate numerical estimate for the integral and hence to derive the properties of edge waves over a shelf. The numerical results are illustrated in a table and curves are presented showing the variation of frequency of the edge waves with the width of the shelf.https://doi.org/10.2478/ijame-2019-0028shelfedge waveshavelock expansiongalerkin approximationgegenbauer polynomialdispersion relation |
| collection |
DOAJ |
| language |
English |
| format |
Article |
| sources |
DOAJ |
| author |
Dolai P. Dolai D.P. |
| spellingShingle |
Dolai P. Dolai D.P. Edge Waves Over a Shelf International Journal of Applied Mechanics and Engineering shelf edge waves havelock expansion galerkin approximation gegenbauer polynomial dispersion relation |
| author_facet |
Dolai P. Dolai D.P. |
| author_sort |
Dolai P. |
| title |
Edge Waves Over a Shelf |
| title_short |
Edge Waves Over a Shelf |
| title_full |
Edge Waves Over a Shelf |
| title_fullStr |
Edge Waves Over a Shelf |
| title_full_unstemmed |
Edge Waves Over a Shelf |
| title_sort |
edge waves over a shelf |
| publisher |
Sciendo |
| series |
International Journal of Applied Mechanics and Engineering |
| issn |
1734-4492 2353-9003 |
| publishDate |
2019-06-01 |
| description |
The problem considered in this paper is the derivation of properties of edge waves travelling along a submerged horizontal shelf. The problem is formulated within the framework of the linearized theory of water waves and Havelock expansions of water wave potentials are used in the mathematical analysis to obtain the dispersion relation for edge waves in terms of an integral. Appropriate multi-term Galerkin approximations involving ultra spherical Gegenbauer polynomials are utilized to obtain a very accurate numerical estimate for the integral and hence to derive the properties of edge waves over a shelf. The numerical results are illustrated in a table and curves are presented showing the variation of frequency of the edge waves with the width of the shelf. |
| topic |
shelf edge waves havelock expansion galerkin approximation gegenbauer polynomial dispersion relation |
| url |
https://doi.org/10.2478/ijame-2019-0028 |
| work_keys_str_mv |
AT dolaip edgewavesoverashelf AT dolaidp edgewavesoverashelf |
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1717781519263596544 |