ON THE ORDER OF APPROXIMATION FOR THE RATIONAL INTERPOLATION TO |x| 被引量：20

ON THE ORDER OF APPROXIMATION FOR THE RATIONAL INTERPOLATION TO |x|

下载PDF

导出

摘要 The order of approximation for Newman-type rational interpolation to |x| is studied in this paper. For general set of nodes, the extremum of approximation error and the order of the best uniform approximation are estimated. The result illustrates the general quality of approximation in a different way. For thespecial case where the interpolation nodes are Xi=(i/n)r(i = 1,2,'' ,n;r>0) . it is proved that the exact order of approximation is O(1/n),O(1/nlogn) and O(1/nr), respectively, corresponding to O<r<1, r=1and r>l. The order of approximation for Newman-type rational interpolation to |x| is studied in this paper. For general set of nodes, the extremum of approximation error and the order of the best uniform approximation are estimated. The result illustrates the general quality of approximation in a different way. For thespecial case where the interpolation nodes are Xi=(i/n)r(i = 1,2,'' ,n;r>0) . it is proved that the exact order of approximation is O(1/n),O(1/nlogn) and O(1/nr), respectively, corresponding to O<r<1, r=1and r>l.

作者 Han Xuli(Central South University, China)

出处《Approximation Theory and Its Applications》 2002年第2期58-64,共7页 逼近论及其应用（英文版）

分类号 O174.41 [理学—基础数学]

引文网络
相关文献

参考文献3

1A. L. Levin,E. B. Saff.Fast decreasing rational functions[J].Israel Journal of Mathematics.1999(1)
2L. Brutman,E. Passow.On Rational Interpolation to |x|[J].Constructive Approximation.1997(3)
3Helmut Werner.Rationale Interpolation von |x| in ?quidistanten Punkten[J].Mathematische Zeitschrift.1982(1)

同被引文献55

1张慧明,李文汉,李令斗.|x|的有理逼近[J].山西师范大学学报（自然科学版）,2006,20(2):10-13. 被引量：2
2郭妞萍,黄志强,杨晓东.在等距节点处对函数∣x∣~α进行拉格朗日插值时的收敛性[J].西南民族大学学报（自然科学版）,2006,32(6):1106-1110. 被引量：4
3谢庭藩.Newman有理插值算子的一个扩充[J].中国计量学院学报,2004,15(3):242-245. 被引量：3
4XiaMao.ON LAGRANGE INTERPOLATION TO |x|α(1 < α < 2) WITH EQUALLY SPACED NODES[J].Analysis in Theory and Applications,2004,20(3):281-287. 被引量：8
5胡雯.关于对│x│有理插值逼近的收敛性[J].温州师范学院学报,2005,26(2):24-30. 被引量：2
6Zhikang Lu,Xifang Ge.THE DIVERGENCE OF LAGRANGE INTERPOLATION FOR |x|~a[J].Analysis in Theory and Applications,2005,21(4):385-394. 被引量：2
7Hui Su Shusheng Xu.THE DIVERGENCE OF LAGRANGE INTERPOLATION FOR |x|~α(2<α<4) AT EQUIDISTANT NODES[J].Analysis in Theory and Applications,2006,22(2):146-154. 被引量：3
8戴慧丽.两类Chebyshev零点的Newman型有理算子逼近|x|的渐近性质[J].中国计量学院学报,2006,17(3):243-245. 被引量：2
9Zhikang Lu,Xifang Ge.THE EXACT CONVERGENCE RATE AT ZERO OF LAGRANGE INTERPOLATION POLYNOMIAL TO|x|~α[J].Analysis in Theory and Applications,2006,22(3):201-207. 被引量：2
10Laiyi Zhu Zhaolin Dong.ON NEWMAN-TYPE RATIONAL INTERPOLATION TO |x| AT THE CHEBYSHEV NODES OF THE SECOND KIND[J].Analysis in Theory and Applications,2006,22(3):262-270. 被引量：11

引证文献20

1张慧明,李文汉,李令斗.|x|的有理逼近[J].山西师范大学学报（自然科学版）,2006,20(2):10-13. 被引量：2
2谢庭藩,周颂平.The Asymptotic Property of Approximation to |x| by Newman Type Rational Operators[J].Journal of Mathematical Research and Exposition,2005,25(1):37-41.
3胡雯.关于对│x│有理插值逼近的收敛性[J].温州师范学院学报,2005,26(2):24-30. 被引量：2
4江东林.函数│x│~α在几何型结合点组的插值多项式的发散性[J].龙岩学院学报,2005,23(3):11-15.
5田漪,蒋艳杰.基于调整的Newman型结点组对|x|的有理插值逼近[J].华北电力大学学报（自然科学版）,2008,35(3):110-112. 被引量：1
6张慧明,李建俊.|x|在(-∞,+∞)的有理逼近[J].山西师范大学学报（自然科学版）,2009,23(3):27-31. 被引量：2
7张慧明,李建俊.|x|在第二类Chebyshev结点的有理逼近[J].郑州大学学报（理学版）,2010,42(2):1-3. 被引量：22
8李建俊,张慧明.利用C#语言解决｜x｜在(-∞,+∞)的有理逼近问题[J].青岛科技大学学报（自然科学版）,2013,34(2):207-211.
9张慧明,李建俊,段继光.|x|在调整的第二类Chebyshev结点组的有理插值[J].数学杂志,2014,34(3):509-514. 被引量：15
10张慧明,段生贵,李建俊.|x|~α(1≤α<2)在等距结点的有理插值[J].华中师范大学学报（自然科学版）,2016,50(1):21-23. 被引量：10

二级引证文献28

1张慧明,李建俊.|x|在(-∞,+∞)的有理逼近[J].山西师范大学学报（自然科学版）,2009,23(3):27-31. 被引量：2
2张慧明,李建俊.|x|在第二类Chebyshev结点的有理逼近[J].郑州大学学报（理学版）,2010,42(2):1-3. 被引量：22
3张慧明,门玉梅,李建俊.|x|在正切结点组的有理插值[J].天津师范大学学报（自然科学版）,2011,31(4):5-6. 被引量：15
4李抒望.论江泽民同志的干部教育思想[J].党政干部论坛,2000(2):34-36. 被引量：2
5李建俊,张慧明.利用C#语言解决｜x｜在(-∞,+∞)的有理逼近问题[J].青岛科技大学学报（自然科学版）,2013,34(2):207-211.
6张慧明,李建俊,段继光.|x|在调整的第二类Chebyshev结点组的有理插值[J].数学杂志,2014,34(3):509-514. 被引量：15
7张慧明,段生贵,李建俊.｜x｜^α在第二类Chebyshev结点的有理插值[J].四川师范大学学报（自然科学版）,2015,38(6):889-892. 被引量：10
8张慧明,段生贵,李建俊,辛玉东.|x|的有理插值[J].高等学校计算数学学报,2016,38(1):52-59. 被引量：10
9张慧明,李建俊.｜x｜~α在Chebyshev结点的有理插值[J].黑龙江大学自然科学学报,2016,33(4):491-495. 被引量：10
10张慧明,李建俊.︱x︱在Newman结点组的有理插值[J].中山大学学报（自然科学版）,2016,55(6):64-66.

1詹倩,许树声,章月红.Newman型有理插值逼近|x|的渐近性质[J].南京大学学报（数学半年刊）,2008,25(1):108-113.
2Chang Wen LI,Xiao Lin ZHU,Le ZOU.Modified Thiele-Werner Rational Interpolation[J].Journal of Mathematical Research and Exposition,2010,30(4):653-663. 被引量：1
3杨文善,李冲.ON A CLASS OF NONLINEAR UNIFORM APPROXIMATION PROBLEMS[J].Numerical Mathematics A Journal of Chinese Universities(English Series),2000,9(1):5-18.
4Zhang Peixuan Shandong University, China..ON UNIFORM APPROXIMATION BY PARTIAL SUMS OF JACOBI SERIES ON ELLIPTIC REGION[J].Analysis in Theory and Applications,1994,10(1):47-57.
5WANG WenHua,GUO ZhiHua,CAO HuaiXin.An upper bound for the adiabatic approximation error[J].Science China(Physics,Mechanics & Astronomy),2014,57(2):218-224. 被引量：5
6詹倩,许树声.基于一类新结点集的Newman型有理插值算子[J].数学进展,2015,44(5):757-764. 被引量：4
7S.A.SETTU.APPROXIMATION OF CONTINUOUS FUNCTIONS BY GENERALIZED KARAMATA MEANS[J].Analysis in Theory and Applications,1994,10(1):88-98.
8ShengBaohuai,LenQiang.Approximation of Certain Modified Rational Interpolation in L^pwSpaces[J].数学研究,1997,30(1):19-24.
9蔡守峰,张树功.THE ALGEBRAIC METHOD OF RATIONAL INTERPOLATION[J].Numerical Mathematics A Journal of Chinese Universities(English Series),2005,14(4):375-382.
10Lai Yi ZHU Ying Ying ZHAO.On Newman-Type Rational Interpolation to |x| at the Adjusted Chebyshev Nodes of the Second Kind[J].Journal of Mathematical Research and Exposition,2011,31(2):202-208. 被引量：1

Approximation Theory and Its Applications

2002年第2期

浏览历史

内容加载中请稍等...

ON THE ORDER OF APPROXIMATION FOR THE RATIONAL INTERPOLATION TO |x| 被引量：20

参考文献3

同被引文献55

引证文献20

二级引证文献28

相关作者

相关机构

相关主题

浏览历史