Uncertainty inequalities for linear canonical transform
作者: X. Guanlei , W. Xiaotong , X. Xiaogang
DOI: 10.1049/IET-SPR.2008.0102
关键词:
摘要: The novel Hausdorff–Young inequalities associated with the linear canonical transform (LCT) are derived based on relation between Fourier and LCT in p-norm space (0
aip.org
sci-hub.se 参考文章(39)
H. Maassen, A discrete entropic uncertainty relation Quantum Probability and Applications V. ,vol. 1442, pp. 263- 266 ,(1990) , 10.1007/BFB0085519
Zeev Zalevsky, Haldun M Ozaktas, M Kutay-Alper, The Fractional Fourier Transform: with Applications in Optics and Signal Processing ,(2001)
Thomas Kailath, Modern signal processing Washington. ,(1985)
Iwo Bialynicki-Birula, Rényi Entropy and the Uncertainty Relations Foundations of probability and physics. ,vol. 889, pp. 52- 61 ,(2007) , 10.1063/1.2713446
Xu Guanlei, Wang Xiaotong, Xu Xiaogang, Fast communication: The logarithmic, Heisenberg's and short-time uncertainty principles associated with fractional Fourier transform Signal Processing. ,vol. 89, pp. 339- 343 ,(2009) , 10.1016/J.SIGPRO.2008.09.002
Adrian Stern, Sampling of compact signals in offset linear canonical transform domains Signal, Image and Video Processing. ,vol. 1, pp. 359- 367 ,(2007) , 10.1007/S11760-007-0029-0
John J. Benedetto, Hans P. Heinig, Weighted Fourier Inequalities: New Proofs and Generalizations Journal of Fourier Analysis and Applications. ,vol. 9, pp. 1- 37 ,(2003) , 10.1007/S00041-003-0003-3
Jeff Gill, An entropy measure of uncertainty in vote choice Electoral Studies. ,vol. 24, pp. 371- 392 ,(2005) , 10.1016/J.ELECTSTUD.2004.10.009
CE Shennon, Warren Weaver, A mathematical theory of communication Bell System Technical Journal. ,vol. 27, pp. 379- 423 ,(1948) , 10.1002/J.1538-7305.1948.TB01338.X
W. Beckner, Inequalities in Fourier Analysis on Rn Proceedings of the National Academy of Sciences of the United States of America. ,vol. 72, pp. 638- 641 ,(1975) , 10.1073/PNAS.72.2.638