Convergence of the Cesaro Mean for Rational Orthonormal Bases

Convergence of the Cesaro Mean for Rational Orthonormal Bases

导出

摘要 This paper deals with the convergence of the Cesaro mean for the rational orthonormal bases. Provided the set of zeroes of rational orthonormal bases is formed by a periodic repetition of the same finite sequence, the explicit expression of so-called block-Fejer kernel is available, and some properties of the block-Fejer kernel are discussed. Based on the convergence of the block-Cesaro mean, the convergence of Cesaro mean is also provided. This paper deals with the convergence of the Cesaro mean for the rational orthonormal bases. Provided the set of zeroes of rational orthonormal bases is formed by a periodic repetition of the same finite sequence, the explicit expression of so-called block-Fejer kernel is available, and some properties of the block-Fejer kernel are discussed. Based on the convergence of the block-Cesaro mean, the convergence of Cesaro mean is also provided.

作者 Ying Xiong FU Luo Qing LI

机构地区 Key Laboratory of Applied Mathematics

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2009年第4期581-592,共12页 数学学报（英文版）

基金 Supported in part by NSFC under Grant 10771053, by the National Research Foundation for the Doctoral Program of Higher Education of China （SRFDP） under Grant 20060512001, and by Natural Science Foundation of Hubei Province under Grant 2007ABA139

关键词 Cesaro mean trigonometric series rational orthonormal basis Cesaro mean, trigonometric series, rational orthonormal basis

分类号 O177.1 [理学—基础数学] O173.1 [理学—基础数学]

引文网络
相关文献

参考文献17

1Akcay, H., Islam, S., Ninness, B.: Identification of power transformer models from frequency response data: A case study. Signal Processing, 68, 307-315 (1998)
2Akcay, H., Ninness, B.: Orthonormal basis funtions for modelling continuous-time systems. Signal Processing, 77, 261-274 (1999)
3Akcay, H., Ninness, B.: Rational basis functions for modelling continuous-time systems. Automatica, 34, 1101-1117 (1998)
4Akcay, H.: Discrete-time system modelling in L^p with orthonormal basis functions. Systems Control Letters, 39, 365-376 (2000)
5Akcay, H.: On the existence of a disk algebra basis. Signal Processing, 80, 903-907 (2000)
6Boche, H., Pohl, V.: On the behavior of disk algebra bases with applications. Signal Processing, 86, 3915-3922 (2006)
7Ninness, B., Hjalmrsson, H., Gustafsson, F.: Generalized Fourier and Toeplitz results for rational orthonormal bases. SIAM J. Cont. Opt., 37(2), 429-460 (1998)
8Broom, P. W.: Discrete orthonormal sequences. Journal of the Association for Computing Machinery, 12(2), 151-168 (1965)
9Gottieb, M. J.: Concerning some polynomials orthogonal on a finite or enumerable set points. American Journal of Mathematics, 60, 453-458 (1938)
10Ninness, B., Gustafsson, F.: A unifying construction of orthonormal bases for system identification. IEEE Trans. Automat. Contr., 42, 515-521 (1997)

1巫世权.秩为k的有限序列t-相交族(英文)[J].数学进展,1998,27(1):59-68.
2拓扑学[J].中国学术期刊文摘,2008,14(5):17-17.
3B.FISHER,K.TA■.On the Non-Commutative Neutrix Product of the Distributions x＋^λ and x^＋μ[J].Acta Mathematica Sinica,English Series,2006,22(6):1639-1644.
4许树声.Hilbert空间中多面体约束最佳逼近的算法[J].江南学院学报,1999,14(3):3-10.
5喻绍梧.数学符号与数学语言[J].四川教育学院学报,2002,18(5):62-64. 被引量：10
6巫世权.贪婪t－相交有限序列族[J].数学进展,1996,25(4):354-359.
7华一明,许树声.多面体最佳逼近的算法[J].南京大学学报（数学半年刊）,2002,19(1):98-105. 被引量：1
8Yu Lan LI,Dun Yan YAN.Orthonormal Bases Associated with Multi-knot Piecewise Linear Function Sequences on[0,1)~n[J].Acta Mathematica Sinica,English Series,2009,25(11):1835-1848. 被引量：1
9黄桂丰,范钦杰.0～1有限序列的无穷*积[J].吉林大学学报（理学版）,2007,45(6):912-914. 被引量：1
10Wenchang Sun,Xingwei Zhou.Construction of wavelet bases with hexagonal symmetry[J].Chinese Science Bulletin,1999,44(9):790-793.

Acta Mathematica Sinica,English Series

2009年第4期

浏览历史

内容加载中请稍等...

Convergence of the Cesaro Mean for Rational Orthonormal Bases

参考文献17

相关作者

相关机构

相关主题

浏览历史