一種改進(jìn)的松弛算法

邵朝; 保錚

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一種改進(jìn)的松弛算法

邵朝, 保錚

文章導(dǎo)航 > 電子與信息學(xué)報(bào) > 1998 > 20(1): 26-32

邵朝, 保錚. 一種改進(jìn)的松弛算法[J]. 電子與信息學(xué)報(bào), 1998, 20(1): 26-32.

引用本文:

邵朝, 保錚. 一種改進(jìn)的松弛算法[J]. 電子與信息學(xué)報(bào), 1998, 20(1): 26-32.

Shao Chao, Bao Zheng. THE IMPROVMENT OF THE RELAX ALGORITHM[J]. Journal of Electronics & Information Technology, 1998, 20(1): 26-32.

Citation:

Shao Chao, Bao Zheng. THE IMPROVMENT OF THE RELAX ALGORITHM[J]. Journal of Electronics & Information Technology, 1998, 20(1): 26-32.

邵朝, 保錚. 一種改進(jìn)的松弛算法[J]. 電子與信息學(xué)報(bào), 1998, 20(1): 26-32.

引用本文:

邵朝, 保錚. 一種改進(jìn)的松弛算法[J]. 電子與信息學(xué)報(bào), 1998, 20(1): 26-32.

Shao Chao, Bao Zheng. THE IMPROVMENT OF THE RELAX ALGORITHM[J]. Journal of Electronics & Information Technology, 1998, 20(1): 26-32.

Citation:

Shao Chao, Bao Zheng. THE IMPROVMENT OF THE RELAX ALGORITHM[J]. Journal of Electronics & Information Technology, 1998, 20(1): 26-32.

一種改進(jìn)的松弛算法

邵朝,
保錚

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出版歷程
- 收稿日期: 1996-10-15
- 修回日期: 1997-06-17
- 刊出日期: 1998-01-19

THE IMPROVMENT OF THE RELAX ALGORITHM

摘要

摘要: 本文從建立松弛(RELAX)算法所對應(yīng)的多維非線性優(yōu)化問題出發(fā),對松弛算法和最大似然(ML)算法進(jìn)行了多方面的比較.基于這些討論,提出了改進(jìn)的RELAX算法。
- RELAX算法; 交替投影（AP）算法; 改進(jìn)的RELAX算法
Abstract: The paper provides the high dimensional optimal problem from which the RELAX algorithm is derived, and compares the RELAX algorithm with the alternating projection algorithm from some aspects. Based on the discussion, an improved RELAX algorithm is proposed. The computer simulation confirms the theory is validity.

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參考文獻(xiàn)(1)

Li J, Stoica P, Zheng D. Angle and waveform estimation in the presence of colored noise via RELAX. submitted to IEEE Trans. on Aerospace and Electronics Systems,1995.[2]Li J, Stoica P. Efficient mixed-spectrum estimation with applications to target feature extraction.[3]IEEE Trans. on Signal Processing. 1996, SP-44(2): 281-295.[4]邵朝,保錚.RELAX算法的相關(guān)域分析.西安電子科技大學(xué)學(xué)報(bào),1997, 24(2): 164-171.[5]Stoica P, Sharman K, Maximum likelihood. Methods for direction-of-arrival estimation. IEEE Trans Acoustics, Speech and Signal Processing, 1990, ASSP-38(7): 1132-1143.[6]Ziskind I, Wax M. Maximum likelihood localization of multiple sources by alternating projection. IEEE Trans. on Acoustics, Speech and Signal Processing. 1988, ASSP-36(10): 1553-1560.[7]Hwang J K, Chen Y C. Superresolution frequency estimation by alternating notch periodgram. IEEE Trans. on Signal Processing, 1993, SP-41(2): 727-741.[8]Viberg M, Ottersten B. Sensor array processing based on subspace fitting. IEEE Trans. on AP, 1991, AP-39(5): 1110-1121.[9]Bresler Y, Macovski A. Exact maximum likelihood parameter estimation of superimposed exponential signals in noise. IEEE Trans. on Signal Processing. 1993, SP-41(2): 727-741.[10]Golub G H, pereyra V. The differentiation of pseudo-inverses and nonlinear least squares problems[11]whose variables separate. SIAM J[J].Numer. Anal.1973, 10(2):413-432

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