Performance bounds for the estimation of finite rate of innovation signals from noisy measurements

In this paper, we derive lower bounds on the estimation error of finite rate of innovation signals from noisy measurements. We first obtain a fundamental limit on the estimation accuracy attainable regardless of the sampling technique. Next, we provide a bound on the performance achievable using any specific sampling method. Essential differences between the noisy and noise-free cases arise from this analysis. In particular, we identify settings in which noise-free recovery techniques deteriorate substantially under slight noise levels, thus quantifying the numerical instability inherent in such methods. The results are illustrated in a time-delay estimation scenario.

[1]  Yonina C. Eldar,et al.  The Cramér-Rao Bound for Estimating a Sparse Parameter Vector , 2010, IEEE Transactions on Signal Processing.

[2]  Thierry Blu,et al.  Sampling Piecewise Sinusoidal Signals With Finite Rate of Innovation Methods , 2010, IEEE Transactions on Signal Processing.

[3]  飛田 武幸,et al.  超多時間理論のWhite Noise Theoryによる表現 , 2007 .

[4]  H. V. Trees Detection, Estimation, And Modulation Theory , 2001 .

[5]  Yonina C. Eldar,et al.  Multichannel Sampling of Pulse Streams at the Rate of Innovation , 2010, IEEE Transactions on Signal Processing.

[6]  Yonina C. Eldar,et al.  Innovation Rate Sampling of Pulse Streams With Application to Ultrasound Imaging , 2010, IEEE Transactions on Signal Processing.

[7]  Yonina C. Eldar,et al.  Low Rate Sampling of Pulse Streams with Application to Ultrasound Imaging , 2010, ArXiv.

[8]  R. Z. Khasʹminskiĭ,et al.  Statistical estimation : asymptotic theory , 1981 .

[9]  Yonina C. Eldar,et al.  Time-Delay Estimation From Low-Rate Samples: A Union of Subspaces Approach , 2009, IEEE Transactions on Signal Processing.

[10]  A. Gualtierotti H. L. Van Trees, Detection, Estimation, and Modulation Theory, , 1976 .

[11]  Thierry Blu,et al.  Sampling signals with finite rate of innovation , 2002, IEEE Trans. Signal Process..

[12]  Martin Vetterli,et al.  Sampling and reconstruction of signals with finite rate of innovation in the presence of noise , 2005, IEEE Transactions on Signal Processing.

[13]  Thierry Blu,et al.  Extrapolation and Interpolation) , 2022 .

[14]  Petre Stoica,et al.  MUSIC, maximum likelihood, and Cramer-Rao bound , 1989, IEEE Transactions on Acoustics, Speech, and Signal Processing.