Sparse representation based direction-of-arrival estimation using circular acoustic vector sensor arrays

Abstract Direction-of-arrival (DOA) estimation using circular array has been attracted significant attention in passive sonar system. Recently, the DOA estimation techniques face some challenges such as the small angle spacing of the incident signals, high correlation or coherence between signals, the considerable ambient noise, etc. To solve these problems, this paper proposes a sparse representation (SR) algorithm to estimate the DOAs of signals in the isotropic ambient noise by using the circular arrays composed of acoustic vector sensors (CAVSA). By exploiting the correlation characteristic of the acoustic pressure and particle velocity, two cross-covariance matrices between the acoustic pressure and x-, y-axes particle velocity are first constructed to eliminate the isotropic ambient noise. Then they are stacked to form an augmented cross-covariance matrix, which fully utilizes the direction information of the x- and y-axes particle velocity components. It is observed an interesting fact that when the number of snapshots is limited, the augmented cross-covariance matrix can be divided into the auto-correlation terms of each signal and the cross-correlation terms of any two incident signals coming from different directions. Based on this, the virtual overcomplete and the extra bases between the acoustic pressure and particle velocity are constructed by Khatri-Rao and Kronecker products, respectively. Finally, the SR-based DOA estimation algorithm is derived via the SR of the augmented cross-covariance vector. Simulation and experimental results demonstrate that the proposed method outperforms some existing DOA estimation methods in terms of the spatial spectrum, the estimation accuracy, and the angular resolution.

[1]  Michael D. Zoltowski,et al.  Eigenstructure techniques for 2-D angle estimation with uniform circular arrays , 1994, IEEE Trans. Signal Process..

[2]  Wei Cui,et al.  Enhanced covariances matrix sparse representation method for DOA estimation , 2015 .

[3]  Arye Nehorai,et al.  Acoustic vector-sensor correlations in ambient noise , 2001 .

[4]  Jos F. Sturm,et al.  A Matlab toolbox for optimization over symmetric cones , 1999 .

[5]  Jisheng Dai,et al.  Sparse Bayesian learning for off-grid DOA estimation with nested arrays , 2018, Digit. Signal Process..

[6]  Hiroyuki Arai,et al.  APRD-MUSIC Algorithm DOA Estimation for Reactance Based Uniform Circular Array , 2016, IEEE Transactions on Antennas and Propagation.

[7]  Bai Xingyu The coherent signal-subspace method based on combined information processing of pressure and particle velocity using the acoustic vector sensor array , 2006 .

[8]  Z.-T. Huang,et al.  Direction-of-Arrival Estimation of Wideband Signals via Covariance Matrix Sparse Representation , 2011, IEEE Transactions on Signal Processing.

[9]  Linrang Zhang,et al.  Efficient sparse representation method for wideband DOA estimation using focusing operation , 2017 .

[10]  Nan Zou,et al.  Circular Acoustic Vector-Sensor Array for Mode Beamforming , 2009, IEEE Transactions on Signal Processing.

[11]  H.-W. Chen,et al.  Wideband MVDR beamforming for acoustic vector sensor linear array , 2004 .

[12]  Björn E. Ottersten,et al.  Covariance Matching Estimation Techniques for Array Signal Processing Applications , 1998, Digit. Signal Process..

[13]  Jisheng Dai,et al.  Direction-of-Arrival Estimation Via Real-Valued Sparse Representation , 2013, IEEE Antennas and Wireless Propagation Letters.

[14]  Zhao,et al.  Detection of number of sources and DOA estimation based on the combined information processing of pressure and particle velocity using acoustic vector sensor array , 2007 .

[15]  Wei Liu,et al.  Blind adaptive wideband beamforming for circular arrays based on phase mode transformation , 2011, Digit. Signal Process..

[16]  Xianpeng Wang,et al.  Real-Valued Covariance Vector Sparsity-Inducing DOA Estimation for Monostatic MIMO Radar , 2015, Sensors.

[17]  Gary R. Wilson,et al.  Vector sensors and vector sensor line arrays: Comments on optimal array gain and detection , 2006 .

[18]  Desen Yang,et al.  Direction-of-arrival estimation for a uniform circular acoustic vector-sensor array mounted around a cylindrical baffle , 2012 .

[19]  Huawei Chen,et al.  Coherent signal-subspace processing of acoustic vector sensor array for DOA estimation of wideband sources , 2005, Signal Process..

[20]  Yiyu Zhou,et al.  Array Signal Processing via Sparsity-Inducing Representation of the Array Covariance Matrix , 2013, IEEE Transactions on Aerospace and Electronic Systems.

[21]  Bo Li,et al.  Multi-Source DOA Estimation Using an Acoustic Vector Sensor Array Under a Spatial Sparse Representation Framework , 2016, Circuits Syst. Signal Process..

[22]  Xingpeng Mao,et al.  Reducing errors for root-MUSIC-based methods in uniform circular arrays , 2018, IET Signal Process..

[23]  Nan Hu,et al.  DOA Estimation for Sparse Array via Sparse Signal Reconstruction , 2013, IEEE Transactions on Aerospace and Electronic Systems.

[24]  Ju-Hong Lee,et al.  Adaptive processing for beamforming with coherent interference using uniform circular arrays , 2008, Digit. Signal Process..

[25]  Shefeng Yan Optimal design of modal beamformers for circular arrays. , 2015, The Journal of the Acoustical Society of America.

[26]  Xiaofei Zhang,et al.  Sparse representation based two-dimensional direction of arrival estimation using co-prime array , 2018, Multidimens. Syst. Signal Process..

[27]  Arye Nehorai,et al.  Acoustic vector-sensor array processing , 1994, IEEE Trans. Signal Process..

[28]  Lei Huang,et al.  Covariance sparsity-aware DOA estimation for nonuniform noise , 2014, Digit. Signal Process..

[29]  Tao Chen,et al.  The Real-Valued Sparse Direction of Arrival (DOA) Estimation Based on the Khatri-Rao Product , 2016, Sensors.

[30]  Dmitry M. Malioutov,et al.  A sparse signal reconstruction perspective for source localization with sensor arrays , 2005, IEEE Transactions on Signal Processing.

[31]  Nan Hu,et al.  A sparse recovery algorithm for DOA estimation using weighted subspace fitting , 2012, Signal Process..

[32]  Qing Ling,et al.  DOA Estimation Using a Greedy Block Coordinate Descent Algorithm , 2012, IEEE Transactions on Signal Processing.

[33]  J. Yin,et al.  Direction-of-Arrival Estimation Using a Sparse Representation of Array Covariance Vectors , 2011, IEEE Transactions on Signal Processing.