Bispectrum estimation using a MISO autoregressive model

Bispectra are third-order statistics that have been used extensively in analyzing nonlinear and non-Gaussian data. Bispectrum of a process can be computed as the Fourier transform of its bicumulant sequence. It is in general hard to obtain reliable bicumulant samples at high lags since they suffer from large estimation variance. This paper proposes a novel approach for estimating bispectrum from a small set of given low lag bicumulant samples. The proposed approach employs an underlying MISO system composed of stable and causal autoregressive components. We provide an algorithm to compute the parameters of such a system from the given bicumulant samples. Experimental results show that our approach is capable of representing non-polynomial spectra with a stable underlying system model, which results in better bispectrum estimation than the leading algorithm in the literature.

[1]  A. Murat Tekalp,et al.  Tekalp-Erdem estimator gives the LS estimate for Fourier phase and log-Fourier modulus , 1993, IEEE Trans. Signal Process..

[2]  Chandan Chakraborty,et al.  Cardiac decision making using higher order spectra , 2013, Biomed. Signal Process. Control..

[3]  A. Murat Tekalp,et al.  Higher-order spectrum factorization in one and two dimensions with applications in signal modeling and nonminimum phase system identification , 1989, IEEE Trans. Acoust. Speech Signal Process..

[4]  Athina P. Petropulu,et al.  Frequency domain blind MIMO system identification based on second and higher order statistics , 2001, IEEE Trans. Signal Process..

[5]  S. V. Narasimhan,et al.  Improved bispectrum estimation based on modified group delay , 2012, Signal Image Video Process..

[6]  A. M. Tekalp,et al.  Matching-extrapolation of bicumulants of one-D signals using two-D AR modeling , 1991, [Proceedings] ICASSP 91: 1991 International Conference on Acoustics, Speech, and Signal Processing.

[7]  A. Murat Tekalp,et al.  Modeling arbitrary polynomial bispectra in one and two dimensions , 1992, IEEE Trans. Signal Process..

[8]  Raghuveer M. Rao,et al.  On the existence of autoregressive models for third-order cumulant matching , 1989, IEEE Trans. Acoust. Speech Signal Process..

[9]  D. L. Ermak,et al.  A method for generating skewed random numbers using two overlapping uniform distributions , 1995 .

[10]  U. Rajendra Acharya,et al.  Data mining technique for automated diagnosis of glaucoma using higher order spectra and wavelet energy features , 2012, Knowl. Based Syst..

[11]  Chrysostomos L. Nikias,et al.  Bispectrum estimation: A parametric approach , 1985, IEEE Trans. Acoust. Speech Signal Process..

[12]  A. Murat Tekalp,et al.  On the measure of the set of factorizable polynomial bispectra , 1990, IEEE Trans. Acoust. Speech Signal Process..