Exact maximum likelihood time delay estimation for short observation intervals

An exact solution is presented to the problem of maximum likelihood time delay estimation for a Gaussian source signal observed at two different locations in the presence of additive, spatially uncorrelated Gaussian white noise. The solution is valid for arbitrarily small observation intervals; that is, the assumption T>> tau /sub c/, mod d mod made in the derivation of the conventional asymptotic maximum likelihood (AML) time delay estimator (where tau /sub c/ is the correlation time of the various random processes involved and d is the differential time delay) is relaxed. The resulting exact maximum likelihood (EML) instrumentation is shown to consist of a finite-time delay-and-sum beamformer, followed by a quadratic postprocessor based on the eigenvalues and eigenfunctions of a one-dimensional integral equation with nonconstant weight. The solution of this integral equation is obtained for the case of stationary signals with rational power spectral densities. Finally, the performance of the EML and AML estimators is compared by means of computer simulations. >

[1]  Dante C. Youla,et al.  The solution of a homogeneous Wiener-Hopf integral equation occurring in the expansion of second-order stationary random functions , 1957, IRE Trans. Inf. Theory.

[2]  J. Ianniello,et al.  Time delay estimation via cross-correlation in the presence of large estimation errors , 1982 .

[3]  Subbarayan Pasupathy Equivalence of transient and narrowband signals , 1978 .

[4]  Peter M. Schultheiss,et al.  Optimum Passive Bearing Estimation in a Spatially Incoherent Noise Environment , 1969 .

[5]  G. Carter,et al.  Special issue on time delay estimation , 1980 .

[6]  A. Weiss,et al.  Fundamental limitations in passive time delay estimation--Part I: Narrow-band systems , 1983 .

[7]  John A. Stuller,et al.  Maximum-likelihood estimation of time-varying delay-Part I , 1987, IEEE Trans. Acoust. Speech Signal Process..

[8]  Benoît Champagne,et al.  Factorization properties of optimum space-time processors in nonstationary environments , 1990, IEEE Trans. Acoust. Speech Signal Process..

[9]  E. J. Hannan,et al.  The estimation of coherence and group delay , 1971 .

[10]  E. Hannan,et al.  Delay estimation and the estimation of coherence and phase , 1981 .

[11]  G. Carter,et al.  The generalized correlation method for estimation of time delay , 1976 .

[12]  John W. Betz Effects of uncompensated relative time companding on a broad-band cross correlator , 1985, IEEE Trans. Acoust. Speech Signal Process..

[13]  Robert V. Foutz,et al.  Estimation of a Common Group Delay between Two Multiple Time Series , 1980 .

[14]  Steven A. Tretter,et al.  Optimum processing for delay-vector estimation in passive signal arrays , 1973, IEEE Trans. Inf. Theory.