Trends in Approximation Theory
Kirill Kopotun, Tom Lyche, Marian Neamtu
Vanderbilt University Press, 2001 - Mathematics - 436 pages
Contains a carefully edited selection of papers that were presented at the Symposium on Trends in Approximation Theory, held in May 2000, and at the Oslo Conference on Mathematical Methods for Curves and Surfaces, held in July 2000. Mathematical Methods for Curves and Surfaces covers topics from abstract approximation to wavelets.
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Nonpositive Jacksontype Approximations to Definite Integrals
Hausdorff Strong Unicity in VectorValued Chebyshev
On Minimal Almost Locally Minimal and Orthogonal Minimal
18 other sections not shown
2001 by Vanderbilt algebra applied Approx Approximation Theory Banach space bases best approximation bivariate boundary bounded cardinal splines Chebyshev coefficients compact Comput condition constant construction continuous functions convergence convex Copyright 2001 cubic defined denote equations error estimates exists fc=o finite form reserved Fourier given greedy algorithms Haar Hardy spaces Hausdorff Hence Hermite interpolation Hilbert space inequality integer interpolating splines Kirill Kopotun L-spline Lagrange interpolation Lemma linear Lyche Marian Neamtu eds Math Mathematics matrix minimal multifilter multiwavelet Nashville nonnegative norm obtain orthogonal orthonormal paper piecewise points problem projection proof proved radial basis functions result Riesz basis rights of reproduction satisfies Section sequence signal smoothness Sobolev spaces solution spline functions spline spaces subset subspace symmetric Theorem transform Trends in Approximation triangles trigonometric trigonometric polynomial unique Vanderbilt University Vanderbilt University Press vector vertex wavelets zero