The Hilbert space geometry of the Rihaczek distribution for stochastic analytic signals

Scharf, L. L.; Schreier, Peter J.; Hanssen, A.

Title: The Hilbert space geometry of the Rihaczek distribution for stochastic analytic signals
Creator: Scharf, L. L.; Schreier, Peter J.; Hanssen, A.
Relation: IEEE Signal Processing Letters Vol. 12, no. 4, p. 297-300
Publisher: IEEE Signal Processing Society
Resource Type: journal article
Date: 2005
Description: The Rihaczek distribution for stochastic signals is a time- and frequency-shift covariant bilinear time-frequency distribution (TFD) based on the Cramer-Loeve spectral representation for a harmonizable process. It is a complex Hilbert space inner product (or cross correlation) between the time series and its infinitesimal stochastic Fourier generator. To this inner product, we may attach an illuminating geometry, wherein the cosine squared of the angle between the time series and its infinitesimal stochastic Fourier generator is given by the Rihaczek distribution. The Rihaczek distribution also determines a time-varying Wiener filter for estimating a time series from its infinitesimal stochastic Fourier generator and measures the resulting error covariance. We propose a factored kernel to construct estimators of the Rihaczek distribution that are contained in Cohen's class of bilinear TFDs.
Subject: complementary correlation; Cramer-Love spectral representation; improper complex random process; nonstationary time series; time-frequency analysis; time-frequency
Identifier: uon:520
Identifier: http://hdl.handle.net/1959.13/24611
Identifier: ISSN:1070-9908
Language: eng
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