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Approximation order of interpolatory nonlinear subdivision schemes

โœ Scribed by Nira Dyn; Philipp Grohs; Johannes Wallner

Publisher
Elsevier Science
Year
2010
Tongue
English
Weight
493 KB
Volume
233
Category
Article
ISSN
0377-0427

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โœฆ Synopsis

Linear interpolatory subdivision schemes of C r smoothness have approximation order at least r + 1. The present paper extends this result to nonlinear univariate schemes which are in proximity with linear schemes in a certain specific sense. The results apply to nonlinear subdivision schemes in Lie groups and in surfaces which are obtained from linear subdivision schemes. We indicate how to extend the results to the multivariate case.

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Subdivision schemes are popular iterative processes to build graphs of functions, curves and surfaces. We analyze the 2-point Hermite C 2 subdivision scheme introduced by Merrien in [26]. For the analysis of its convergence and its smoothness properties we are concerned with the computation of the j