|
|
|
Relevance vector machine technique for the inverse scattering problem |
| Wang Fang-Fang(王芳芳) and Zhang Ye-Rong(张业荣)† |
| School of Electronic Science and Engineering, Nanjing University of Posts and Telecommunications, Nanjing 210003, China |
|
|
|
|
Abstract A novel method based on the relevance vector machine (RVM) for the inverse scattering problem is presented in this paper. The nonlinearity and the ill-posedness inherent in this problem are simultaneously considered. The nonlinearity is embodied in the relation between the scattered field and the target property, which can be obtained through the RVM training process. Besides, rather than utilizing regularization, the ill-posed nature of the inversion is naturally accounted for because the RVM can produce a probabilistic output. Simulation results reveal that the proposed RVM-based approach can provide comparative performances in terms of accuracy, convergence, robustness, generalization, and improved performance in terms of sparse property in comparison with the support vector machine (SVM) based approach.
|
Received: 26 August 2011
Revised: 27 April 2012
Accepted manuscript online:
|
|
PACS:
|
02.30.Zz
|
(Inverse problems)
|
| |
29.40.Gx
|
(Tracking and position-sensitive detectors)
|
| |
41.20.Jb
|
(Electromagnetic wave propagation; radiowave propagation)
|
| |
81.70.Ex
|
(Nondestructive testing: electromagnetic testing, eddy-current testing)
|
|
| Fund: Project supported by the National Natural Science Foundation of China (Grant No. 61071022) and the Graduate Student Research and Innovation Program of Jiangsu Province, China (Grant No. CXZZ11-0381). |
Cite this article:
Wang Fang-Fang(王芳芳) and Zhang Ye-Rong(张业荣) Relevance vector machine technique for the inverse scattering problem 2012 Chin. Phys. B 21 050204
|
| [1] |
Ferris D D and Currie N C 1999 Proc. SPIE 3577 62
|
| [2] |
Baranoski E J 2008 J. Frank. Inst. 345 556
|
| [3] |
Soldovieri F and Solimene R 2007 IEEE Geosc. Rem. Sens. Lett. 4 513
|
| [4] |
Soldovieri F, Solimene R and Prisco G 2008 IEEE Trans. Geosci. Remot. Sens. 46 1192
|
| [5] |
Chew W C and Wang Y M 1990 IEEE Trans. Med. Imag. 9 218
|
| [6] |
Cui T J, Chew W C, Aydiner A A and Chen S Y 2001 IEEE Trans. Geosci. Remot. Sens. 39 339
|
| [7] |
Li F H, Liu Q H and Song L P 2004 IEEE Geosc. Rem. Sens. Lett. 1 107
|
| [8] |
Song L P, Yu C and Liu Q H 2005 IEEE Trans. Geosci. Remot. Sens. 43 2793
|
| [9] |
Song L P, Liu Q H, Li F H and Zhang Z Q 2005 IEEE Trans. Antennas Propagat. 53 1556
|
| [10] |
Zhang Z Q and Liu Q H 2004 IEEE Trans. Biomed. Eng. 51 544
|
| [11] |
Smola A J and Scholkopf B 2004 Stat. Comput. 14 199
|
| [12] |
Sun Z H and Jiang F 2010 Chin. Phys. B 19 110502
|
| [13] |
Meng Q F, Chen Y H and Peng Y H 2009 Chin. Phys. B 18 2194
|
| [14] |
Zhang Q H, Xiao B X and Zhu G Q 2007 Microwave Opt. Technol. Lett. 49 372
|
| [15] |
Bermani E, Boni A, Caorsi S and Massa A 2003 IEEE Trans. Geosci. Remot. Sens. 41 927
|
| [16] |
Wang F F and Zhang Y R 2011 J. Electromagn. Waves Appl. 25 75
|
| [17] |
Massa A, Boni A and Donelli M 2005 IEEE Trans. Geosci. Remot. Sens. 43 2084
|
| [18] |
Kim Y and Ling H 2009 IEEE Trans. Geosci. Remot. Sens. 47 1328
|
| [19] |
Tipping M E 2001 J. Mach. Learn. Res. 1 211
|
| No Suggested Reading articles found! |
|
|
Viewed |
|
|
|
Full text
|
|
|
|
|
Abstract
|
|
|
|
|
Cited |
|
|
|
|
Altmetric
|
|
blogs
Facebook pages
Wikipedia page
Google+ users
|
Online attention
Altmetric calculates a score based on the online attention an article receives. Each coloured thread in the circle represents a different type of online attention. The number in the centre is the Altmetric score. Social media and mainstream news media are the main sources that calculate the score. Reference managers such as Mendeley are also tracked but do not contribute to the score. Older articles often score higher because they have had more time to get noticed. To account for this, Altmetric has included the context data for other articles of a similar age.
View more on Altmetrics
|
|
|
