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- ...depth in [[:Category:Eigenfunction Matching Method|Eigenfunction Matching Method]] ...ce]] and [[:Category:Eigenfunction Matching Method| Eigenfunction Matching Method]])8 KB (1,301 words) - 10:28, 2 May 2010
- analog of the [[Eigenfunction Matching for a Semi-Infinite Dock]]. == Solution Method ==9 KB (1,632 words) - 23:59, 16 October 2009
- at an angle. For the later we refer to the solution [[Eigenfunction Matching for a Semi-Infinite Dock]]. == Solution Method ==7 KB (1,154 words) - 23:59, 16 October 2009
- The simpler solution for a [[Eigenfunction Matching for a Semi-Infinite Floating Elastic Plate|Semi-Infinite Elastic Plate]] de ==Method of solution==7 KB (1,198 words) - 14:30, 12 June 2018
- the [[:Category:Boundary Element Method|Boundary Element Method]]. The method is a modified version of the [[Boundary Element Method for a Fixed Body in Finite Depth]] described previously.7 KB (1,145 words) - 03:15, 12 February 2010
- [[Eigenfunction Matching for a Finite Floating Elastic Plate using Symmetry]]. The simpler problem of dock is treated in [[Green Function Method for Finite Dock]]6 KB (980 words) - 10:50, 28 April 2010
- in [[Cylindrical Eigenfunction Expansion]]. The simplest problem is that explicit method to calculate the diffraction transfer matrices for bodies of11 KB (1,980 words) - 08:17, 19 October 2009
- [[Eigenfunction Matching for a Finite Rectangle using Symmetry]] == Solution Method ==9 KB (1,520 words) - 01:28, 16 March 2012
- the [[:Category:Boundary Element Method|Boundary Element Method]]. == Solution Method ==8 KB (1,400 words) - 21:32, 10 February 2010
- == Solution Method == [[Category:Eigenfunction Matching Method]]5 KB (932 words) - 01:23, 7 April 2010
- The problem was solved by [[Fox and Squire 1994]] but the solution method here is slightly different. The simpler theory for a [[Eigenfunction Matching for a Semi-Infinite Dock|Dock]] describes10 KB (1,684 words) - 20:51, 17 March 2010
- to the problem of [[Eigenfunction Matching Method for Floating Elastic Plates|multiple elastic plates]] and from here we know (for details of this notation see [[Eigenfunction Matching Method for Floating Elastic Plates]]).15 KB (2,564 words) - 09:38, 20 October 2009
- The solution is an extension of the [[Eigenfunction Matching for a Circular Dock]]. ==Solution Method==17 KB (3,010 words) - 04:44, 19 July 2010
- It is the fundamental tool for the [[Green Function Solution Method]] ...sed on an [[:Category:Eigenfunction Matching Method|Eigenfunction Matching Method]]. We write the Green function as11 KB (2,041 words) - 08:57, 19 August 2010
- eigenfunction as the positive one. Therefore, only positive ones are the finite depth case, this can be rewritten as the eigenfunction7 KB (1,280 words) - 09:34, 20 October 2009
- [[Eigenfunction Matching for a Finite Rectangle using Symmetry]] == Solution Method ==13 KB (2,011 words) - 01:18, 19 March 2012
- The generalized eigenfunction method goes back to the work of [[Povzner 1953]] and [[Ikebe 1960]]. The generalized eigenfunction14 KB (2,229 words) - 00:26, 25 February 2010
- ...can also be found using [[Eigenfunction Matching for a Semi-Infinite Dock| eigenfunction expansion]] our method of deriving the solutions.23 KB (3,976 words) - 22:14, 6 September 2009
- This problem is solved completely and the solution method may be particularly useful in modelling wave propagation through frazil or ...00]] and [[Williams and Squire 2002]], who solve it using a Green Function method.30 KB (4,556 words) - 10:52, 10 September 2009