مرکز منطقه ای اطلاع رساني علوم و فناوري - Bivariate Symmetry Associated Continued Fractions Blending Rational Interpolation

DocumentCode :

1845109

Title :

Bivariate Symmetry Associated Continued Fractions Blending Rational Interpolation

Author :

Le Zou ; Changwen Li ; Jin Xie ; Chuanlin Li

Author_Institution :

Key Lab. of Network & Intell. Inf. Process., Hefei Univ., Hefei, China

fYear :

2013

fDate :

21-23 June 2013

Firstpage :

864

Lastpage :

867

Abstract :

By introducing partial divided differences and partial inverse differences, bivariate symmetry associated continued fractions blending rational interpolation is constructed. We discuss the recursive algorithm, interpolation theorem and error estimation. We extend the conclusion to vector valued, matrix valued cases and the triangular net case.

Keywords :

interpolation; matrix algebra; bivariate symmetry associated continued fractions blending rational interpolation; error estimation; interpolation theorem; inverse differences; matrix valued cases; partial divided differences; recursive algorithm; triangular net case; Educational institutions; Electronic mail; Interpolation; Physics; Polynomials; Associated continued fractions; Newton interpolation polynomial; Symmetry continued fractions;

fLanguage :

English

Publisher :

ieee

Conference_Titel :

Computational and Information Sciences (ICCIS), 2013 Fifth International Conference on

Conference_Location :

Shiyang

Type :

conf

DOI :

10.1109/ICCIS.2013.232

Filename :

6643148

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=1845109