Gabor systems on discrete periodic sets 被引量：4

Gabor systems on discrete periodic sets

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摘要 Due to its good potential for digital signal processing, discrete Gabor analysis has interested some mathematicians. This paper addresses Gabor systems on discrete periodic sets, which can model signals to appear periodically but intermittently. Complete Gabor systems and Gabor frames on discrete periodic sets are characterized; a sufficient and necessary condition on what periodic sets admit complete Gabor systems is obtained; this condition is also proved to be sufficient and necessary for the existence of sets E such that the Gabor systems generated by χE are tight frames on these periodic sets; our proof is constructive, and all tight frames of the above form with a special frame bound can be obtained by our method; periodic sets admitting Gabor Riesz bases are characterized; some examples are also provided to illustrate the general theory. Due to its good potential for digital signal processing, discrete Gabor analysis has interested some mathematicians. This paper addresses Gabor systems on discrete periodic sets, which can model signals to appear periodically but intermittently. Complete Gabor systems and Gabor frames on discrete periodic sets are characterized; a sufficient and necessary condition on what periodic sets admit complete Gabor systems is obtained; this condition is also proved to be sufficient and necessary for the existence of sets E such that the Gabor systems generated by χ E are tight frames on these periodic sets; our proof is constructive, and all tight frames of the above form with a special frame bound can be obtained by our method; periodic sets admitting Gabor Riesz bases are characterized; some examples are also provided to illustrate the general theory.

作者 LI YunZhang LIAN QiaoFang

机构地区 College of Applied Sciences Department of Mathematics

出处《Science China Mathematics》 SCIE 2009年第8期1639-1660,共22页 中国科学：数学（英文版）

基金 supported by National Natural Science Foundation of China (Grant No. 10671008) Beijing Natural Science Foundation (Grant No. 1092001) PHR (IHLB) and the project sponsored by SRF for ROCS,SEM of China

关键词 Gabor systems periodic sets discrete Zak transform 42C40 Gabor systems periodic sets discrete Zak transform

分类号 O174.2 [理学—基础数学]

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参考文献21

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同被引文献61

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引证文献4

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
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Gabor systems on discrete periodic sets 被引量：4

参考文献21

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