DocumentCode :
3407647
Title :
Construction of new bivariate blending rational interpolation over the triangular grids
Author :
Xiaolei, Yu ; Shuo, Tang
Author_Institution :
Sch. of Mathematic, Hefei Univ. of Technol., Hefei, China
fYear :
2010
fDate :
22-24 Oct. 2010
Firstpage :
399
Lastpage :
403
Abstract :
Laid foundation on the advantages of the simple expressions, easy to calculate of continued fractions interpolation and polynomial interpolation; small calculation quantity, no poles, good numerical stability of barycentric rational interpolation, then two kind of new bivariate blending rational interpolation are constructed over the triangular grids. The first one is based on Thiele´s interpolating continued fraction and barycentric rational interpolation; second one is based on barycentric rational interpolation and polynomial interpolation. The new blending rational interpolation inherited the advantages of continued fraction interpolation, polynomial interpolation and barycentric rational interpolation, and the error estimation is given. Numerical example is given to demonstrate the accuracy and robustness of the new approach.
Keywords :
interpolation; numerical stability; barycentric rational interpolation; bivariate blending rational interpolation; continued fractions interpolation; error estimation; numerical stability; polynomial interpolation; triangular grids; Polynomials; Thiele´s interpolating continued fraction; barycentric rational interpolation; blending rational interpolation; partial reciprocal difference; polynomial interpolation;
fLanguage :
English
Publisher :
ieee
Conference_Titel :
Intelligent Computing and Integrated Systems (ICISS), 2010 International Conference on
Conference_Location :
Guilin
Print_ISBN :
978-1-4244-6834-8
Type :
conf
DOI :
10.1109/ICISS.2010.5656095
Filename :
5656095
Link To Document :
https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=3407647
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