面向低信噪比的自适应压缩感知方法

文方青; 张弓; 陶宇; 刘苏; 冯俊杰

doi:10.7498/aps.64.084301

摘要

在压缩感知工程应用中, 信号往往被噪声和干扰所影响, 常规的压缩感知方法难以达到理想的重构效果, 特别是低信噪比应用场景中, 稀疏重构往往会失效. 分析了压缩感知中噪声对重构性能的影响, 从理论上解释了压缩感知中的噪声折叠原理, 并在此基础上提出了一种基于方向性测量的自适应压缩感知方案. 该方案通过后端信号处理系统估计出噪声的相关信息并反馈至压缩感知前端, 前端根据反馈的噪声信息调整测量矩阵, 从而改变感知矩阵的方向, 自适应地感知稀疏谱, 从而有效地抑制信号噪声. 仿真实验表明, 所提的自适应压缩感知方法对稀疏信号重构性能有较大的提升.

关键词:

Abstract

As an alternative paradigm to the Shannon-Nyquist sampling theorem, compressive sensing enables sparse signals to be acquired by sub-Nyquist analog-to-digital converters thus may launch a revolution in signal collection, transmission and processing. In the practical compressive sensing applications, the sparse signal is always affected by noise and interference, and therefore the recovery performance reduces based on the conventional compressive sensing, especially in the low signal-to-noise scene, the sparse recovery is usually unavailable. In this paper, the influence of noise on recovery performance is analyzed, so as to provide the theoretical basis for the noise folding phenomenon in compressive sensing. From the analysis, we find that the expected noise gain in the random measure process is closely related to the row and column of the measurement matrix. However, only those columns corresponding to the support for the sparse signal contribute to the sparse vector. In the traditional Shannon-Nyquist sampling system, an antialiasing filter is applied before the sampling process, so as to filter the noise beyond the passband of interest. Inspired by the necessity of antialiasing filtering in bandpass signal sampling, we propose a selective measurement scheme, namely adapted compressive sensing, whose measurement matrix can be updated according to the noise information fed back by the processing center. The measurement matrix is specially designed, and the sensing matrix has directivity so that the signal noise can be suppressed. The measurement matrix senses only the spectrum of interest, where the sparse spectrum is most likely to lie. Moreover, we compare the recovery performance of the proposed adaptive scheme with those of the non-adaptive orthogonal matching pursuit algorithm, FOCal underdetermined system solver algorithm, and sarse Bayesian learning algorithm. Extensive numerical experiments show that the proposed scheme has a better improvement in the performance of the sparse signal recovery. From the viewpoint of implementation, the measurement noise should be taken into consideration in the system, and more efficient algorithms will be developed for source pre-estimation at lower signal-to-noise ratio.

Keywords:

作者及机构信息

1.
南京航空航天大学电子信息工程学院, 南京 210016;

2.
南京航空航天大学, 雷达成像与微波光子技术教育部重点实验室, 南京 210016

基金项目: 国家自然科学基金(批准号: 61071163, 61201367, 61271327, 61471191)、南京航空航天大学博士学位论文创新与创优基金(批准号: BCXJ14-08)、江苏省研究生培养创新工程(批准号: KYLX_0277)、中央高等学校基本科研业务费专项资金(批准号: NP2015504)和江苏高等学校优势学科建设工程资助的课题.

Authors and contacts

1.
College of Electronic and Information Engineering, Nanjing University of Aeronautics and Astronautics, Nanjing 210016, China;

2.
Key Laboratory of Radar Imaging and Microwave Photonics, Ministry of Education, Nanjing University of Aeronautics and Astronautics, Nanjing 210016, China

Funds: Project supported by the National Natural Science Foundation of China (Grant Nos. 61071163, 61201367, 61271327, 61471191), the Funding for Outstanding Doctoral Dissertation of Nanjing University of Aeronautics and Astronautic, China (Grant No. BCXJ14-08), the Innovation Program for Graduate Education of Jiangsu Province, China (Grant No. KYLX_0277), the Fundamental Research Funds for the Central Universities, China (Grant No. NP2015504), and the Priority Discipline Development Program of Jiangsu Higher Education Institutions, China.

参考文献

[1]	Donoho D L 2006 IEEE Trans. Inform. Theory 52 1289
[2]	Mishali M, Eldar Y C 2009 IEEE Trans. Signal Process. 57 993
[3]	Zhang J C, Fu N, Qiao L Y 2014 Acta Phys. Sin. 63 030701 (in Chinese) [张京超, 付宁, 乔立岩 2014 物理学报 63 030701]
[4]	Wang L Y, Li L, Yan B, Jiang C S, Wang H Y, Bao S L 2010 Chin. Phys. B 19 088106
[5]	Zhao S M, Zhuang P 2014 Chin. Phys. B 23 054203
[6]	Sun Y L, Tao J X 2014 Chin. Phys. B 23 078703
[7]	Wang Z, Wang B Z 2014 Acta Phys. Sin. 63 120202 (in Chinese) [王哲, 王秉中 2014 物理学报 63 120202]
[8]	Yang F Q, Zhang D H, Huang K D 2014 Acta Phys. Sin. 63 058701 (in Chinese) [杨富强, 张定华, 黄魁东 2014 物理学报 63 058701]
[9]	Candes E J, Tao T 2005 IEEE Trans. Inform. Theory 51 4203
[10]	Rao B D, Engan K, Cotter S F 2003 IEEE Trans. Signal Process. 51 760
[11]	Castro E A, Eldar Y C 2011 IEEE Signal Process. Lett. 18 478
[12]	Davenport M A, Laska J N, Treichler J, Baraniuk R G 2012 IEEE Trans. Signal Process. 60 4628
[13]	Cotter S F, Rao B D, Engan K, Delgado K K 2005 IEEE Trans. Signal Process. 53 2477
[14]	Candes E J 2008 Comptes Rendus Mathematique 346 589
[15]	Tropp J A, Gilbert A C 2007 IEEE Trans. Inform. Theory 53 4655
[16]	Ji S H, Xue Y, Carin L 2008 IEEE Trans. Signal Process. 56 2346
[17]	Davenport M A 2010 Ph. D. Dissertation (Texas: Rice University)
[18]	Zhang J D, Zhu D Y, Zhang G 2012 IEEE Trans. Signal Process. 60 1718
[19]	Wipf D P, Rao D B 2007 IEEE Trans. Signal Process. 55 3704

施引文献

[1]	Donoho D L 2006 IEEE Trans. Inform. Theory 52 1289
[2]	Mishali M, Eldar Y C 2009 IEEE Trans. Signal Process. 57 993
[3]	Zhang J C, Fu N, Qiao L Y 2014 Acta Phys. Sin. 63 030701 (in Chinese) [张京超, 付宁, 乔立岩 2014 物理学报 63 030701]
[4]	Wang L Y, Li L, Yan B, Jiang C S, Wang H Y, Bao S L 2010 Chin. Phys. B 19 088106
[5]	Zhao S M, Zhuang P 2014 Chin. Phys. B 23 054203
[6]	Sun Y L, Tao J X 2014 Chin. Phys. B 23 078703
[7]	Wang Z, Wang B Z 2014 Acta Phys. Sin. 63 120202 (in Chinese) [王哲, 王秉中 2014 物理学报 63 120202]
[8]	Yang F Q, Zhang D H, Huang K D 2014 Acta Phys. Sin. 63 058701 (in Chinese) [杨富强, 张定华, 黄魁东 2014 物理学报 63 058701]
[9]	Candes E J, Tao T 2005 IEEE Trans. Inform. Theory 51 4203
[10]	Rao B D, Engan K, Cotter S F 2003 IEEE Trans. Signal Process. 51 760
[11]	Castro E A, Eldar Y C 2011 IEEE Signal Process. Lett. 18 478
[12]	Davenport M A, Laska J N, Treichler J, Baraniuk R G 2012 IEEE Trans. Signal Process. 60 4628
[13]	Cotter S F, Rao B D, Engan K, Delgado K K 2005 IEEE Trans. Signal Process. 53 2477
[14]	Candes E J 2008 Comptes Rendus Mathematique 346 589
[15]	Tropp J A, Gilbert A C 2007 IEEE Trans. Inform. Theory 53 4655
[16]	Ji S H, Xue Y, Carin L 2008 IEEE Trans. Signal Process. 56 2346
[17]	Davenport M A 2010 Ph. D. Dissertation (Texas: Rice University)
[18]	Zhang J D, Zhu D Y, Zhang G 2012 IEEE Trans. Signal Process. 60 1718
[19]	Wipf D P, Rao D B 2007 IEEE Trans. Signal Process. 55 3704

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