Estimation of real-valued sinusoidal signal frequencies based on ESPRIT and propagator methods

In this paper, two new techniques are proposed for estimating multiple real-valued sine wave frequencies based on ESPRIT and propagator methods. These techniques are direct methods, which do not require any peak search. A new data model is proposed, which gives the dimension of the signal subspace is equal to the number of frequencies present in the observation. But, the signal subspace dimension is twice the number of frequencies in the conventional MUSIC method for estimating frequencies of real-valued sinusoidal signal. Then, the ESPRIT and propagator based techniques are presented using the proposed new data model. The frequency estimation technique based on propagator is a computationally efficient method which does not require eigen decomposition of the covariance matrix of the observation as like ESPRIT based method. So it requires less computational complexity as compare to ESPRIT based technique at the cost of negligible deviation in the estimate. Computer simulations are carried out to demonstrate the performance of the proposed techniques.

[1]  Heng-Ming Tai,et al.  Autocorrelation-based algorithm for single-frequency estimation , 2007, Signal Process..

[2]  Kaushik Mahata Subspace fitting approaches for frequency estimation using real-valued data , 2005, IEEE Transactions on Signal Processing.

[3]  Frankie K. W. Chan,et al.  An exact analysis of Pisarenko's single-tone frequency estimation algorithm , 2003, Signal Process..

[4]  Jeffrey D. Klein Fast algorithms for single frequency estimation , 2006, IEEE Transactions on Signal Processing.

[5]  Vladimir V. Lukin,et al.  Estimation of single-tone signal frequency by using the L-DFT , 2007, Signal Process..

[6]  Thomas Kailath,et al.  ESPRIT-estimation of signal parameters via rotational invariance techniques , 1989, IEEE Trans. Acoust. Speech Signal Process..

[7]  Torsten Söderström,et al.  Statistical analysis of MUSIC and subspace rotation estimates of sinusoidal frequencies , 1991, IEEE Trans. Signal Process..

[8]  Petre Stoica,et al.  MUSIC estimation of real-valued sine-wave frequencies , 1995, Signal Process..

[9]  Torsten Söderström,et al.  ESPRIT-like estimation of real-valued sinusoidal frequencies , 2004, IEEE Transactions on Signal Processing.

[10]  Frankie K. W. Chan,et al.  Accurate frequency estimation for real harmonic sinusoids , 2004, IEEE Signal Processing Letters.

[11]  Torsten Söderström,et al.  Optimally Weighted MUSIC for Frequency Estimation , 1995, SIAM J. Matrix Anal. Appl..

[12]  Bülent Sankur,et al.  Subspace-based frequency estimation of sinusoidal signals in alpha-stable noise , 2002, Signal Process..

[13]  R. O. Schmidt,et al.  Multiple emitter location and signal Parameter estimation , 1986 .

[14]  Frankie K. W. Chan,et al.  A generalized weighted linear predictor frequency estimation approach for a complex sinusoid , 2006, IEEE Transactions on Signal Processing.

[15]  Gene H. Golub,et al.  An analysis of the total least squares problem , 1980, Milestones in Matrix Computation.

[16]  Igor Djurovic Estimation of the Sinusoidal Signal Frequency Based on the Marginal Median DFT , 2007, IEEE Transactions on Signal Processing.

[17]  Bhaskar D. Rao,et al.  Weighted subspace methods and spatial smoothing: analysis and comparison , 1993, IEEE Trans. Signal Process..