NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES

Mao Yongcai; Bao Zheng

Volume 18 Issue 6

Nov. 1996

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Article Navigation > Journal of Electronics & Information Technology > 1996 > 18(6): 574-581

Mao Yongcai, Bao Zheng. NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES[J]. Journal of Electronics & Information Technology, 1996, 18(6): 574-581.

Citation:

Mao Yongcai, Bao Zheng. NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES[J]. Journal of Electronics & Information Technology, 1996, 18(6): 574-581.

Mao Yongcai, Bao Zheng. NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES[J]. Journal of Electronics & Information Technology, 1996, 18(6): 574-581.

Citation:

Mao Yongcai, Bao Zheng. NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES[J]. Journal of Electronics & Information Technology, 1996, 18(6): 574-581.

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NONPARAMETRIC SPECTRAL ESTIMATORS FOR SECOND ORDER (ALMOST) CYCLOSTATIONARY COMPLEX PROCESSES

Received Date: 1994-12-13
Rev Recd Date: 1995-10-24
Publish Date: 1996-11-19

Abstract

Abstract

Second-order almost cyclostationary complex processes are complex random signals with almost periodically time-varying statistics. Smoothed periodograms are proposed for discrete-time complex 2nd-order cyclostationary processes as cyclic spectral estimation and are shown to be consistent. Asymptotic covariance expressions are derived along with their computable forms.

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References(1)

References

Dandawate A V，Giannakis G B. IEEE Trans. on IT, 1994, IT-40(1):67-84.[2]Brillinger D R. Time Series: Data Analysis and Theory. San Francisco, CA: Holden-Day, 1981,1-30.[3]Brillinger D R, Rosenblatt M. Asymptotic Theory of Estimates of k-th Order Spectra, in Spectral Analysis of Time Series, ed. B. Harris, New York: Wiley, 1967, 153-188.[4]Swami A. Signal Processing, 1994, 36(3):355-373.

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