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Transfinite mean value interpolation over polygons

Abstract

Mean value interpolation is a method for fitting a smooth function to piecewise-linear data prescribed on the boundary of a polygon of arbitrary shape, and has applications in computer graphics and curve and surface modelling. The method generalizes to transfinite interpolation, i.e., to any continuous data on the boundary but a mathematical proof that interpolation always holds has so far been missing. The purpose of this note is to complete this gap in the theory.
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Category

Academic article

Language

English

Author(s)

  • Michael S. Floater
  • Francesco Patrizi

Affiliation

  • University of Oslo
  • SINTEF Digital / Mathematics and Cybernetics

Year

2019

Published in

Numerical Algorithms

ISSN

1017-1398

Publisher

Springer

Page(s)

1 - 9

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