Enhanced Model Order Estimation using Higher-Order Arrays

Frequently, R-dimensional subspace-based methods are used to estimate the parameters in multi-dimensional harmonic retrieval problems in a variety of signal processing applications. Since the measured data is multi-dimensional, traditional approaches require stacking the dimensions into one highly structured matrix. Recently, we have shown how an HOSVD based low-rank approximation of the measurement tensor leads to an improved signal subspace estimate, which can be exploited in any multi-dimensional subspace-based parameter estimation scheme. To achieve this goal, it is required to estimate the model order of the multi-dimensional data. In this paper, we show how the HOSVD of the measurement tensor also enables us to improve the model order estimation step. This is due to the fact that only one set of eigenvalues is available in the matrix case. Applying the HOSVD, we obtain R + 1 sets of n-mode singular values of the measurement tensor that are used jointly to improve the accuracy of the model order selection significantly.

[1]  Anna Lee,et al.  Centrohermitian and skew-centrohermitian matrices , 1980 .

[2]  Thomas Kailath,et al.  Detection of signals by information theoretic criteria , 1985, IEEE Trans. Acoust. Speech Signal Process..

[3]  Jorma Rissanen,et al.  The Minimum Description Length Principle in Coding and Modeling , 1998, IEEE Trans. Inf. Theory.

[4]  M. Haardt,et al.  Higher Order SVD Based Subspace Estimation to Improve Multi-Dimensional Parameter Estimation Algorithms , 2006, 2006 Fortieth Asilomar Conference on Signals, Systems and Computers.

[5]  Pascal Larzabal,et al.  Some properties of ordered eigenvalues of a Wishart matrix: application in detection test and model order selection , 1996, 1996 IEEE International Conference on Acoustics, Speech, and Signal Processing Conference Proceedings.

[6]  Thomas Kailath,et al.  Detection of number of sources via exploitation of centro-symmetry property , 1994, IEEE Trans. Signal Process..

[7]  Joos Vandewalle,et al.  A Multilinear Singular Value Decomposition , 2000, SIAM J. Matrix Anal. Appl..

[8]  Martin Haardt,et al.  Model Order Selection for Short Data: An Exponential Fitting Test (EFT) , 2007, EURASIP J. Adv. Signal Process..

[9]  Josef A. Nossek,et al.  Simultaneous Schur decomposition of several nonsymmetric matrices to achieve automatic pairing in multidimensional harmonic retrieval problems , 1998, IEEE Trans. Signal Process..