Kernel Approximation on Manifolds II: The $L_{\infty}$-norm of the $L_2$-projector

Fran J Narcowich; Joe D Ward; Thomas Hangelbroek; Xingping Sun

arxiv: 1005.2424 · v2 · pith:GZ26Q4SGnew · submitted 2010-05-13 · 🧮 math.CA · cs.NA· math.FA· math.NA

Kernel Approximation on Manifolds II: The L_(infty)-norm of the L₂-projector

Thomas Hangelbroek , Fran J Narcowich , Xingping Sun , Joe D Ward This is my paper

classification 🧮 math.CA cs.NAmath.FAmath.NA

keywords approximationinftykernelleastprojectorsquarestheoryaddresses

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This article addresses two topics of significant mathematical and practical interest in the theory of kernel approximation: the existence of local and stable bases and the L_p--boundedness of the least squares operator. The latter is an analogue of the classical problem in univariate spline theory, known there as the "de Boor conjecture". A corollary of this work is that for appropriate kernels the least squares projector provides universal near-best approximations for functions f\in L_p, 1\le p\le \infty.

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Kernel Approximation on Manifolds II: The L_(infty)-norm of the L₂-projector

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