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Yoon, Jungho - Department of Mathematics, Ewha Womans University
Computer Aided Geometric Design 23 (2006) 351360 www.elsevier.com/locate/cagd
COMPUTATIONAL ASPECTS OF APPROXIMATION TO SCATTERED DATA BY USING `SHIFTED' THIN-PLATE SPLINES
Approximation by Conditionally Positive De nite Functions with Finitely Many Centers
/ 00219045/01 $35. Copyright Academic Press
SPECTRAL APPROXIMATION ORDERS OF RADIAL BASIS FUNCTION INTERPOLATION ON THE SOBOLEV SPACE #
Advances in Computational Mathematics (2006) 25: 5772 Springer 2006 Stationary binary subdivision schemes using radial basis
Advances in Computational Mathematics 14: 329359, 2001. 2001 Kluwer Academic Publishers. Printed in the Netherlands.
Approximation by Conditionally Positive Definite Functions with Finitely Many Centers
APPROXIMATION IN L p (R d ) FROM A SPACE SPANNED BY THE SCATTERED SHIFTS OF A RADIAL BASIS FUNCTION
Approximation to Scattered Data by Radial Basis Function
A New Class of Non-stationary Interpolatory Subdivision Schemes Based on Exponential Polynomials
Journal of Computational and Applied Mathematics 186 (2006) 450465 www.elsevier.com/locate/cam
MATHEMATICS OF COMPUTATION Volume 72, Number 243, Pages 13491367
Journal of Computational and Applied Mathematics 155 (2003) 163175 www.elsevier.com/locate/cam
SPECTRAL APPROXIMATION ORDERS OF RADIAL BASIS FUNCTION INTERPOLATION ON THE SOBOLEV SPACE
DOI: 10.1007/s003650010033 Constr. Approx. (2001) 17: 227247
MATHEMATICS OF COMPUTATION Volume 72, Number 243, Pages 1349{1367
SIAM J. NUMER. ANAL. c 2005 Society for Industrial and Applied Mathematics Vol. 43, No. 1, pp. 259279
Convergence Property of Increasingly Flat Radial Basis function Interpolation to Polynomial
