Content deleted Content added
m more specific stub type |
added reference to transfinite mapping |
||
Line 1:
In [[numerical analysis]], '''transfinite interpolation''' is a means to construct [[Function (mathematics)|functions]] over a planar ___domain in such a way that they match a given function on the boundary. This method is applied in [[geometric model]]ling and in the field of [[finite element method]].
This method receives its name due to how a function belonging to this class is able to match the primitive function at a nondenumerable number of points.<ref>{{Citation
| first = William
| last = Gordon
| author-link =
| first2 = Linda
| last2 = Thiel
| author2-link =
| editor-last =Thomson
| editor-first = Joe
| editor2-last =
| editor2-first =
| contribution = Transfinite mapping and their application to grid generation
| contribution-url =
| series = Numerical grid generation
| year =1982
| pages =171-233
| place =
| publisher =
| url =
| doi =
| id = }}</ref>
== References ==
<references>
* Dyken, C., Floater, M. "Transfinite mean value interpolation", ''Computer Aided Geometric Design'', Volume 26, Issue 1, January 2009, Pages 117–134
| |||