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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
- 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
- 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
- The case of a [[Finite Dock]] is treated very similarly. The problem can also We begin with the [[Frequency Domain Problem]] for a dock which occupies7 KB (1,111 words) - 00:43, 25 April 2017
- The solution method is an extension of [[Eigenfunction Matching for a Finite Dock]] We begin with the [[Frequency Domain Problem]] for a dock which occupies10 KB (1,978 words) - 23:29, 14 February 2010