Information bounds for random signals in time-frequency plane

被引:0
|
作者
Aviyente, S [1 ]
Williams, WJ [1 ]
机构
[1] Univ Michigan, Dept Elect Engn & Comp Sci, Ann Arbor, MI 48109 USA
来源
2001 IEEE INTERNATIONAL CONFERENCE ON ACOUSTICS, SPEECH, AND SIGNAL PROCESSING, VOLS I-VI, PROCEEDINGS: VOL I: SPEECH PROCESSING 1; VOL II: SPEECH PROCESSING 2 IND TECHNOL TRACK DESIGN & IMPLEMENTATION OF SIGNAL PROCESSING SYSTEMS NEURALNETWORKS FOR SIGNAL PROCESSING; VOL III: IMAGE & MULTIDIMENSIONAL SIGNAL PROCESSING MULTIMEDIA SIGNAL PROCESSING - VOL IV: SIGNAL PROCESSING FOR COMMUNICATIONS; VOL V: SIGNAL PROCESSING EDUCATION SENSOR ARRAY & MULTICHANNEL SIGNAL PROCESSING AUDIO & ELECTROACOUSTICS; VOL VI: SIGNAL PROCESSING THEORY & METHODS STUDENT FORUM | 2001年
关键词
D O I
暂无
中图分类号
O42 [声学];
学科分类号
070206 ; 082403 ;
摘要
Renyi entropy has been proposed as one of the methods for measuring signal information content and complexity on the time-frequency plane by several authors [1, 2]. It provides a quantitative measure for the uncertainty of the signal. All of the previous work concerning Renyi entropy in the time-frequency plane has focused on determining the number of signal components in a given deterministic signal. In this paper, we are going to discuss the behaviour of Renyi entropy when the signal is random, more specifically white complex Gaussian noise. We are going to present the bounds on the expected value of Renyi entropy and discuss ways to minimize the uncertainty by deriving conditions on the time-frequency kernel. The performance of minimum entropy kernels in determining the number of signal elements will be demonstrated. Finally, some possible applications of Renyi entropy for signal detection will be discussed.
引用
收藏
页码:3549 / 3552
页数:4
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