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Characterizations of g-Frames and g-Riesz Bases in Hilbert Spaces 被引量:37

Characterizations of g-Frames and g-Riesz Bases in Hilbert Spaces
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摘要 In this paper, we introduce the pre-frame operator Q for the g-frame in a complex Hilbert space, which will play a key role in studying g-frames and g-Riesz bases etc. Using the pre-frame operator Q, we give some necessary and sufficient conditions for a g-Bessel sequence, a g-frame, and a g-Riesz basis in a complex Hilbert space, which have properties similar to those of the Bessel sequence, frame, and Riesz basis respectively. We also obtain the relation between a g-frame and a g-Riesz basis, and the relation of bounds between a g-frame and a g-Riesz basis. Lastly, we consider the stability of a g-frame or a g-Riesz basis for a Hilbert space under perturbation. In this paper, we introduce the pre-frame operator Q for the g-frame in a complex Hilbert space, which will play a key role in studying g-frames and g-Riesz bases etc. Using the pre-frame operator Q, we give some necessary and sufficient conditions for a g-Bessel sequence, a g-frame, and a g-Riesz basis in a complex Hilbert space, which have properties similar to those of the Bessel sequence, frame, and Riesz basis respectively. We also obtain the relation between a g-frame and a g-Riesz basis, and the relation of bounds between a g-frame and a g-Riesz basis. Lastly, we consider the stability of a g-frame or a g-Riesz basis for a Hilbert space under perturbation.
作者 Yu Can ZHU
机构地区 Department of Mathematics P. R. China
出处 《Acta Mathematica Sinica,English Series》 SCIE CSCD 2008年第10期1727-1736,共10页 数学学报(英文版)
基金 the Natural Science Foundation of Fujian Province,China (No.Z0511013) the Education Commission Foundation of Fujian Province,China (No.JB04038)
关键词 FRAME g-Bessel sequence G-FRAME g-Riesz basis frame, g-Bessel sequence, g-frame, g-Riesz basis
分类号 O14 [理学—基础数学]
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参考文献20

  • 1Duffin, R. J., Schaeffer, A. C.: A class of nonharmonic Fourier series. Trans. Amer. Math. Soc., 72, 341-366 (1952)
  • 2Casazza, P. G.: The art of frame theory. Taiwan Residents J. of Math., 4(2), 129-201 (2000)
  • 3Christensen, O.: An Introduction to Prames and Riesz Bases, Birkhauser, Boston, 2003
  • 4Christensen, O.: Frames, Riesz bases, and discrete Gabor/wavelet expansions. Bull. Amer. Math. Soc., 38(3), 273-291 (2001)
  • 5Yang, D. Y., Zhou, X. W., Yuan, Z. Z.: Frame wavelets with compact supports for L2(Rn). Acta Mathernatica Sinica, English Series, 23(2), 349-356 (2007)
  • 6Li, Y. Z.: A class of bidimensional FMRA wavelet frames. Acta Mathematica Sinica, English Series, 22(4), 1051-1062 (2006)
  • 7Zhu, Y. C.: q-Besselian frames in Banach spaces. Acta Mathematica Sinica, English Series, 23(9), 1707- 1718 (2007)
  • 8Li, C. Y., Cao, H. X.: Xd frames and Reisz bases for a Banach space. Acta Mathematica Sinica, Chinese Series, 49(6), 1361-1366 (2006)
  • 9Sun, W.: G-frames and g-Riesz bases. J. Math. Anal. Appl., 322(1), 437-452 (2006)
  • 10Sun, W.: Stability of g-frames. J. Math. Anal. Appl., 326(2), 858-868 (2007)

同被引文献138

  • 1XIAO XiangChun & ZENG XiaoMing Department of Mathematics,Xiamen University,Xiamen 361005,China.Some equalities and inequalities of g-continuous frames[J].Science China Mathematics,2010,53(10):2621-2632. 被引量:9
  • 2施咸亮,陈芳.Gabor框架的必要条件[J].中国科学(A辑),2006,36(12):1413-1421. 被引量:5
  • 3丁明玲,朱玉灿.g-框架的稳定性[J].福州大学学报(自然科学版),2007,35(3):321-325. 被引量:10
  • 4肖祥春,朱玉灿,王燕津,丁明玲.由g-Bessel序列定义的线性算子的一些性质[J].福州大学学报(自然科学版),2007,35(3):326-330. 被引量:6
  • 5Sun W. G-frames and g-Riesz bases[J]. J Math Anal Appl, 2006, 322(1) : 437 -452.
  • 6Sun W. Stability of g-frames[J]. J Math Anal Appl, 2006, 326(2) : 858 -868.
  • 7Casazza P G , Christensen O, Linder A. Riesz-Fiseher sequences and lower frame bounds[J]. Z Anal Anwend, 2002, 21(2) : 305 - 314.
  • 8Taylor A E, Lay D C. Introduction to functional analysis[ M]. New York: Wiley, 1980.
  • 9DuffinRJ,SchaefferAC.A class of nonharmonic Four ierseries[J].Trans Amer Math Soc,1952(72):341-366.
  • 10Sun W.G-frames and g-Riesz bases[J].J Math Anal Appl,2006(322):437-452.

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Acta Mathematica Sinica,English Series
2008年 第10期

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