An Analogue of Beurling's Theorem for the Jacobi Transform

An Analogue of Beurling's Theorem for the Jacobi Transform

导出

摘要 In this paper, we prove Beurling＇s theorem for the Jacobi transform, from which we derive some other versions of uncertainty principles. In this paper, we prove Beurling＇s theorem for the Jacobi transform, from which we derive some other versions of uncertainty principles.

作者 Ji Zheng HUANG He Ping LIU Jian Ming LIU

机构地区 LMAM

出处《Acta Mathematica Sinica,English Series》 SCIE CSCD 2009年第1期85-94,共10页 数学学报（英文版）

基金 Project 10871003 supported-by National Natural Science Foundation of China the Specialized Research Fund for the Doctoral Program of Higher Education of China (No. 20030001107)

关键词 Jacobi transform uncertainty principle Beurling＇s theorem Abel transform Jacobi transform, uncertainty principle, Beurling＇s theorem, Abel transform

分类号 O175.9 [理学—基础数学]

引文网络
相关文献

参考文献1

1T.KAWAZOE,LIUJIANMING.HEAT KERNEL AND HARDY'S THEOREM FOR JACOBI TRANSFORM[J].Chinese Annals of Mathematics,Series B,2003,24(3):359-366. 被引量：2

二级参考文献11

1Eguchi, M., Koizumi, S. & Kumahara, K., An Lp version of the Hardy theorem for motion groups, J.Austral. Math. Soc. (Series A), 68(2000), 55-67.
2Flensted-Jensen, M., Paley-Wiener type theorems for a differential operator connected with symmetric spaces, Ark. Mat., 10(1972), 143-162.
3Giulini, S. & Mauceri, G., Analysis of a distinguished Laplacian on solvable Lie groups; Math. Nachr.,163(1993), 151-162.
4Hardy, G. H., A theorem concerning Fourier transform, J. London Math. Soc., 8(1933), 227-231.
5Koornwinder, T. H., Jacobi functions and analysis on noncompact semisimple Lie groups, in Special functions: Group Theoretical Aspects and Applications, Askey R., et al (eds.), D. Reidel Publishing Company Dordrecht, 1984, 1-84.
6Sengupta, J., An analogue of Hardy's theorem for semi-simple Lie groups, Proc. Amer. Math. Soc., 128(2000), 2493-2499.
7Sitaram, A. & Sundari, M., An analogue of Hardy's theorem for very rapidly decreasing functions on semi-simple Lie groups, Pacific J. Math., 177(1997), 187-200.
8Anker, J. Ph., Damek, E. & Yacoub, C., Spherical analysis on harmonic AN group, Ann. Scuola Norm. Sup. Pisa, ⅩⅩⅢ(1996), 643-679.
9Bagechi, S. C. & Ray, S. K., Uncertainty principles like Hardy's theorem on some Lie groups, J.Austral. Math. Soc. (Series A), 65(1999), 289-302.
10Cowling, M. G. & Price, J. P., Generalizations of Hesenberg's inequality, in Harmonc Analysis, G.Mauceri, F. Ricci, & G. Weiss (eds.), Lecture Notes in Math., 992, Springer-Verlag, Berlin, 1983,443-449.

共引文献1

1Takeshi KAWAZOE,Jianming LIU.On Hardy's Theorem on SU(1,1)[J].Chinese Annals of Mathematics,Series B,2007,28(4):429-440.

1黄泽霞,胡劲松,郑克龙.求实对称矩阵的特征向量的一个简便方法[J].成都工业学院学报,2014,17(4):6-8. 被引量：3
2蔡若松,王信存,肖雪梅.可细分平移不变样条函数空间的性质和特征[J].辽东学院学报（自然科学版）,2014,21(3):207-210.
3储志俊,蒋勇.无界区域上的一类有理逼近算子[J].无锡轻工大学学报（食品与生物技术）,2000,19(6):646-648.
4于正文,尹庆莉.求特征值的Jacobi方法[J].山东科学,2011,24(6):19-21. 被引量：4
5顾央青.介绍求实对称矩阵正交特征向量的一种解题方法[J].浙江工商职业技术学院学报,2003,2(3):70-71. 被引量：2
6李百浩,蒋长锦.一个求实对称矩阵的全部特征值及特征向量的新方法[J].中国科学技术大学学报,1993,23(4):465-469.
7刘叶玲,姬战怀.实对称矩阵特征值和特征向量的数值算法[J].西安科技大学学报,2007,27(2):313-315.
8何光渝,郑书英.渗流力学问题中的数值反演解[J].应用力学学报,1997,14(1):113-117. 被引量：5
9赵守江,刘巧静,马德宜.实对称矩阵特征向量的简易求法探索[J].新校园（上旬刊）,2016,0(10):107-107.
10吕小红,吴传生.Abel变换数值反演的积分算子方法[J].数学杂志,2009,29(3):383-386. 被引量：2

Acta Mathematica Sinica,English Series

2009年第1期

浏览历史

内容加载中请稍等...

An Analogue of Beurling's Theorem for the Jacobi Transform

参考文献1

二级参考文献11

共引文献1

相关作者

相关机构

相关主题

浏览历史