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• Free-Surface Green Function
  The Free-Surface Green function is one of the most important objects in linear It is based on the [[Frequency Domain Problem]]. The exact form of the Green function
  11 KB (2,041 words) - 08:57, 19 August 2010
• Free-Surface Green function for a Floating Elastic Plate
  #REDIRECT [[Free-Surface Green Function for a Floating Elastic Plate]]
  70 bytes (9 words) - 10:16, 30 May 2006
• Free-Surface Green Function for a Floating Elastic Plate
  This is a special version of the free-surface Green function which applied when the [[Floating Elastic Plate]] ...n Function]] in the limit 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

Page text matches

• Peter and Meylan 2004b
  ...H Meylan]], The eigenfunction expansion of the infinite depth free surface Green function in three dimensions, ''Wave Motion'', '''40'''(1),
  1 KB (171 words) - 00:28, 3 August 2006
• Kim 1965a
  W. D. Kim, On the harmonic oscillations of a rigid body on a free surface, Contains an expression for the [[Free-Surface Green Function]] in [[Infinite Depth]].
  200 bytes (31 words) - 09:44, 29 May 2006
• Hermans 2004
  A. J. Hermans, Interaction of Free-Surface Waves with Floating Flexible Strips, based on the [[Free-Surface Green Function]]
  283 bytes (38 words) - 09:02, 22 August 2006
• Havelock 1955a
  Contains an expression for the [[Free-Surface Green Function]] in [[Infinite Depth]].
  223 bytes (32 words) - 09:42, 29 May 2006
• Black 1975
  Contains the [[Free-Surface Green Function]] for [[Finite Depth]]
  230 bytes (31 words) - 05:34, 28 April 2009
• Fenton 1978
  Contains the [[Free-Surface Green Function]] for [[Finite Depth]]
  233 bytes (32 words) - 09:24, 9 December 2006
• Integral Equation for the Finite Depth Green Function at Surface
  <math>G(x,\xi)</math> is the [[Free-Surface Green Function]] for two-dimensional waves, with singularity at the water surface. We break the surface into <math>N</math> evenly spaced point
  748 bytes (118 words) - 09:06, 19 August 2010
• John 1950
  It also contain an expression for the [[Free-Surface Green Function]].
  341 bytes (50 words) - 03:54, 1 June 2006
• Newman 1994
  using the eigenfunction for the plate and the [[Free-Surface Green Function]]
  292 bytes (41 words) - 08:59, 22 August 2006
• Wang, Meylan, and Porter 2006
  found by using a special version of the [[Free-Surface Green Function]] which contains the infinite number of image Green functions.
  547 bytes (81 words) - 07:13, 6 July 2006
• Meylan and Squire 1994
  The soluton was found using the [[Free-Surface Green Function]].
  430 bytes (66 words) - 03:02, 10 September 2006
• Infinite Array Green Function
  on an infinite image system of [[Free-Surface Green Function|Free-Surface Green Functions]] such that <math>z=0</math> coincides with the mean free surface of the water.
  11 KB (1,951 words) - 09:11, 9 January 2009
• Green Function Solution Method
  The use of the [[Free-Surface Green Function]] to solve the [[Standard Linear Wave Scattering Problem]] We then use [http://en.wikipedia.org/wiki/Green's_identities Green's second identity]
  2 KB (282 words) - 19:34, 8 February 2010
• Free-Surface Green Function
  The Free-Surface Green function is one of the most important objects in linear It is based on the [[Frequency Domain Problem]]. The exact form of the Green function
  11 KB (2,041 words) - 08:57, 19 August 2010
• Rankine Intergral Equations For Ship Flows
  | previous chapter = [[Solution of Wave-Body Flows, Green's Theorem]] ...xtends easily to flows past ships in calm water and in waves when the free surface condition is more complex than that of the <math>U=0\,</math> frequency dom
  6 KB (949 words) - 23:36, 16 October 2009
• Floating Elastic Plates of Identical Properties
  We consider the entire free surface to be occupied by a [[Floating Elastic Plate]] with a single discontinuity The [[Free-Surface Green Function for a Floating Elastic Plate]] satisfies the following equations (plus the
  18 KB (3,393 words) - 14:11, 6 June 2007
• Green Function Methods for Floating Elastic Plates
  using a [[Free-Surface Green Function]] by [[Newman 1994]] and [[Meylan and Squire 1994]]. We describe The simpler problem of dock is treated in [[Green Function Method for Finite Dock]]
  6 KB (980 words) - 10:50, 28 April 2010
• Solution of Wave-Body Flows, Green's Theorem
  | chapter title = Solution of Wave-Body Flows, Green's Theorem ...em using either a wave-source potential or the Rankine source as the Green function. The numerical solution of the resulting integral equations in practice is
  13 KB (2,103 words) - 19:55, 26 July 2012
• Free-Surface Green Function for a Floating Elastic Plate
  This is a special version of the free-surface Green function which applied when the [[Floating Elastic Plate]] ...n Function]] in the limit 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
• Diffraction Transfer Matrix
  arbitrary geometry in the case of finite depth. Utilising a Green's function they used the standard
  11 KB (1,980 words) - 08:17, 19 October 2009

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