Polynomial expansions for cardinal interpolants and orthonormal wavelets /

Bibliographic Details
Main Authors:	Chui, C. K. (Author), Stöckler, Joachim (Author), Ward, J. D. (Joseph D.) (Author)
Format:	Book
Language:	English
Published:	College Station, Texas : Center for Approximation Theory, Department of Mathematics, Texas A & M University, 1990.
Series:	CAT report ; no. 234.
Subjects:	Orthogonal polynomials. Interpolation. Wavelets (Mathematics) Fourier series. Approximation theory.

Description
Abstract:	For a compactly supported function phi on R^s we develop methods for computing the Fourier coefficients of transforms f( Ph̃i) of the symbol of phi. This problem arises in cardinal interpolation and in the construction of orthonormal wavelets. When the range of the symbol is a real interval expansions of f in terms of orthogonal polynomials seem adequate. For complex valued Ph̃i a Faber expansion of f is used.
Item Description:	"November 1990." Offprint: Curves and surfaces / edited by Pierre-Jean Laurent, Alain Le Méhauté, Larry L. Schumaker.
Physical Description:	8 pages ; 28 cm
Bibliography:	Includes bibliographical references (page 8).