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Chebyshev approximation by linear combinations of fixed knot polynomial splines with weighting functions

journal contribution
posted on 2016-11-01, 00:00 authored by N Sukhorukova, Julien UgonJulien Ugon
In this paper, we derive conditions for best uniform approximation by fixed knots polynomial splines with weighting functions. The theory of Chebyshev approximation for fixed knots polynomial functions is very elegant and complete. Necessary and sufficient optimality conditions have been developed leading to efficient algorithms for constructing optimal spline approximations. The optimality conditions are based on the notion of alternance (maximal deviation points with alternating deviation signs). In this paper, we extend these results to the case when the model function is a product of fixed knots polynomial splines (whose parameters are subject to optimization) and other functions (whose parameters are predefined). This problem is nonsmooth, and therefore, we make use of convex and nonsmooth analysis to solve it.

History

Journal

Journal of optimization theory and applications

Volume

171

Pagination

536-549

Location

New York, N.Y.

ISSN

0022-3239

eISSN

1573-2878

Language

eng

Publication classification

C Journal article, C1.1 Refereed article in a scholarly journal

Copyright notice

2016, Springer Science+Business Media New York

Issue

2

Publisher

Springer