Difference between revisions of "Variable Bottom Topography"
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The linear wave scattering by variable depth (or bottom topography) in the | The linear wave scattering by variable depth (or bottom topography) in the | ||
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approaches have been developed. The first is analytical and the solution is | approaches have been developed. The first is analytical and the solution is | ||
derived in an almost closed form ([[Porter and Chamberlain 1995]], [[Staziker, Porter and Stirling 1996]] and | derived in an almost closed form ([[Porter and Chamberlain 1995]], [[Staziker, Porter and Stirling 1996]] and | ||
| − | [[Porter and Porter 2000]]). | + | [[Porter and Porter 2000]]). |
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| − | + | The second approach is numerical, an example of which is the method | |
| − | + | developed by [[Liu and Liggett 1982]], in which the boundary element method in a finite | |
| − | developed by [[ | ||
region is coupled to a separation of variables solution in the semi-infinite | region is coupled to a separation of variables solution in the semi-infinite | ||
outer domains. This method is well suited to the inclusion of the plate as | outer domains. This method is well suited to the inclusion of the plate as | ||
Latest revision as of 19:13, 8 February 2010
The linear wave scattering by variable depth (or bottom topography) in the absence of a floating plate has been considered by many authors. Two approaches have been developed. The first is analytical and the solution is derived in an almost closed form (Porter and Chamberlain 1995, Staziker, Porter and Stirling 1996 and Porter and Porter 2000).
The second approach is numerical, an example of which is the method developed by Liu and Liggett 1982, in which the boundary element method in a finite region is coupled to a separation of variables solution in the semi-infinite outer domains. This method is well suited to the inclusion of the plate as will be shown. For both the analytic and numerical approach the region of variable depth must be bounded.
Wave scattering by a Floating Elastic Plate on water of Variable Bottom Topography was treated in Wang and Meylan 2002 and is described in Floating Elastic Plate on Variable Bottom Topography
