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- We consider the problem of small-amplitude waves which are incident on finite floating elastic plate occupying water surface for <math>-L<x<L</math>.1 KB (232 words) - 00:44, 17 September 2009
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- The problem of a two-dimensional finite dock is solved using a green function. ...m is solved using eigenfunction matching in [[Eigenfunction Matching for a Finite Dock]].1 KB (168 words) - 00:42, 17 September 2009
- We consider the problem of small-amplitude waves which are incident on finite floating elastic plate occupying water surface for <math>-L<x<L</math>.1 KB (232 words) - 00:44, 17 September 2009
- The problem of a dock is solved in [[Green Function Method for a Finite Dock]] and for a floating elastic plate is solved3 KB (408 words) - 00:31, 24 September 2009
- ...the equations for a plate on a fluid, ignoring boundary conditions at the plate edge and assuming the plate occupies the entire fluid region.7 KB (1,042 words) - 07:15, 4 April 2009
- ...m of a two-dimensional [[:Category:Floating Elastic Plate|Floating Elastic Plate]] was solved We present here the solution for a floating elastic plate using dry modes.6 KB (980 words) - 10:50, 28 April 2010
- The infinite array is often used as an approximation for a finite array as its solution is very much simpler. Besides allowing the approximat by an incident plate wave and the second is to determine what waves are supported by the4 members (0 subcategories, 0 files) - 05:41, 28 April 2009
- We begin with the [[Frequency Domain Problem]]. plate which has radius <math>a</math>. The water is assumed to have5 KB (818 words) - 00:01, 17 October 2009
- ...a finite [[:Category:Floating Elastic Plate|Floating Elastic Plate]] on [[Finite Depth]]. ...Matching for a Semi-Infinite Floating Elastic Plate|Semi-Infinite Elastic Plate]] describes7 KB (1,198 words) - 14:30, 12 June 2018
- We develop here a theory to solve for a three-dimensional floating elastic plate. For a classical thin plate, the equation of motion is given by9 KB (1,498 words) - 05:48, 30 October 2012
- a thin plate on water of shallow draft). We will present here the theory for a rigid bod in water of finite depth.14 KB (2,229 words) - 00:26, 25 February 2010
- We show here a solution for a dock on [[Finite Depth]] water, which is circular. This is the three-dimensional We begin with the [[Frequency Domain Problem]].9 KB (1,632 words) - 23:59, 16 October 2009
- We consider fixed vertical plate and determine scattering using [[:Category:Symmetry in Two Dimensions]] constant finite depth <math>h</math> and the <math>z</math>-direction points vertically5 KB (932 words) - 01:23, 7 April 2010
- We begin with the [[Frequency Domain Problem]] for a dock which occupies constant finite depth <math>h</math> and the <math>z</math>-direction points vertically23 KB (3,976 words) - 22:14, 6 September 2009
- We show here a solution for a [[Floating Elastic Plate]] on [[Finite Depth]] water We begin with the [[Frequency Domain Problem]] for a [[Floating Elastic Plate]]17 KB (3,010 words) - 04:44, 19 July 2010
- dimensional floating plate on water of variable depth is derived from dividing the water domain into two semi-infinite domains and a finite41 KB (6,389 words) - 09:22, 20 October 2009
- ...-infinite [[:Category:Floating Elastic Plate|Floating Elastic Plate]] on [[Finite Depth]]. ...jpg|thumb|right|300px|Wave scattering by a submerged semi-infinite elastic plate]]10 KB (1,684 words) - 20:51, 17 March 2010
- [[Bottom Mounted Cylinder]] or scattering from a [[Circular Floating Elastic Plate]]. In these cases it is easy to find ...e dimensional (depth dependent) case. We begin by assuming the [[Frequency Domain Problem]].7 KB (1,280 words) - 09:34, 20 October 2009
- and a submerged dock/plate through which We begin with the [[Frequency Domain Problem]] for the submerged dock in7 KB (1,154 words) - 23:59, 16 October 2009
- ...the free-surface Green function which applied when the [[Floating Elastic Plate]] ...as the plate terms tend to zero and to the Green function for an infinite plate in the limit as the water terms tend to zero.17 KB (2,953 words) - 16:40, 8 December 2009
- [[Eigenfunction Matching Method for a Semi-Infinite Floating Elastic Plate]]. We assume that the first and last plate are semi-infinite. The presentation here does not20 KB (3,273 words) - 00:05, 17 October 2009