Transfinite interpolation

In numerical analysis, transfinite interpolation is a means to construct functions over a planar domain in such a way that they match a given function on the boundary. This method is applied in geometric modelling 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.^[1]

References

Dyken, C., Floater, M. "Transfinite mean value interpolation", Computer Aided Geometric Design, Volume 26, Issue 1, January 2009, Pages 117–134

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^ Gordon, William; Thiel, Linda (1982), "Transfinite mapping and their application to grid generation", in Thomson, Joe (ed.), Numerical grid generation, pp. 171–233 {{citation}}: Missing or empty |title= (help)

[1] Gordon, William; Thiel, Linda (1982), "Transfinite mapping and their application to grid generation", in Thomson, Joe (ed.), Numerical grid generation, pp. 171–233 {{citation}}: Missing or empty |title= (help)

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