中国邮电高校学报(英文) ›› 2016, Vol. 23 ›› Issue (2): 15-23.doi:

• Wireless • 上一篇    下一篇

Fixed-point ICA algorithm for blind separation of complex mixtures containing both circular and noncircular sources

姚俊良,任海鹏,刘庆   

  1. 西安理工大学
  • 收稿日期:2015-07-13 修回日期:2015-11-25 出版日期:2016-04-28 发布日期:2016-04-28
  • 通讯作者: 姚俊良 E-mail:yaojunliang@xaut.edu.cn
  • 基金资助:

    国家自然科学基金项目;陕西省重点科技创新团队

Fixed-point ICA algorithm for blind separation of complex mixtures containing both circular and noncircular sources

  • Received:2015-07-13 Revised:2015-11-25 Online:2016-04-28 Published:2016-04-28
  • Supported by:

    National Natural Science Foundation of China;Innovative Research Team of Shaanxi Province

摘要:

Fixed-point algorithms are widely used for independent component analysis (ICA) owing to its good convergence. However, most existing complex fixed-point ICA algorithms are limited to the case of circular sources and result in phase ambiguity, that restrict the practical applications of ICA. To solve these problems, this paper proposes a two-stage fixed-point ICA (TS-FPICA) algorithm which considers complex signal model. In this algorithm, the complex signal model is converted into a new real signal model by utilizing the circular coefficients contained in the pseudo-covariance matrix. The algorithm is thus valid to noncircular sources. Moreover, the ICA problem under the new model is formulated as a constrained optimization problem, and the real fixed-point iteration is employed to solve it. In this way, the phase ambiguity resulted by the complex ICA is avoided. The computational complexity and convergence property of TS-FPICA are both analyzed theoretically. Simulation results show that the proposed algorithm has better separation performance and without phase ambiguity in separated signals compared with other algorithms. TS-FPICA convergences nearly fast as the other fixed-point algorithms, but far faster than the joint diagonalization method, e.g. joint approximate diagonalization of eigenmatrices (JADE).

关键词:

ICA, fixed-point iteration, noncircular complex signal, phase ambiguity

Abstract:

Fixed-point algorithms are widely used for independent component analysis (ICA) owing to its good convergence. However, most existing complex fixed-point ICA algorithms are limited to the case of circular sources and result in phase ambiguity, that restrict the practical applications of ICA. To solve these problems, this paper proposes a two-stage fixed-point ICA (TS-FPICA) algorithm which considers complex signal model. In this algorithm, the complex signal model is converted into a new real signal model by utilizing the circular coefficients contained in the pseudo-covariance matrix. The algorithm is thus valid to noncircular sources. Moreover, the ICA problem under the new model is formulated as a constrained optimization problem, and the real fixed-point iteration is employed to solve it. In this way, the phase ambiguity resulted by the complex ICA is avoided. The computational complexity and convergence property of TS-FPICA are both analyzed theoretically. Simulation results show that the proposed algorithm has better separation performance and without phase ambiguity in separated signals compared with other algorithms. TS-FPICA convergences nearly fast as the other fixed-point algorithms, but far faster than the joint diagonalization method, e.g. joint approximate diagonalization of eigenmatrices (JADE).

Key words:

ICA, fixed-point iteration, noncircular complex signal, phase ambiguity