基于改进的Chahine迭代算法的粒径分布反演
[1] 邵鸿飞, 柴娟, 黄辉. 粒度分析及粒度标准物质研究进展[J]. 化学分析计量, 2012, 21(2): 99-101.
Shao Hongfei, Chai Juan, Huang Hui. Research progress of particle size analysis and particle size standard reference material[J]. Chemical Analysis and Meterage, 2012, 21(2): 99-101. (in Chinese)
[2] 王乃宁.颗粒粒径的光学测量技术及应用[M].北京: 原子能出版社, 2000: 168-175.
Wang Naining. Optic Measurement Technology of Particle Size and Its Application[M]. Beijing: Atomic Energy Press, 2002: 168-175. (in Chinese)
[3] Kouzelis D, Candel S M, Esposito E, et al. Particle sizing by laser light diffraction: improvements in optics and algorithms[J]. Particle & Particle Systems Characterization, 1987, 4(1-4): 151-156.
[4] 王丽, 孙晓刚. 基于模式搜索的光谱消光粒径分布反演算法的研究[J]. 光谱学与光谱分析, 2013, 33(3): 618-622.
Wang Li, Sun Xiaogang. Research on pattern search method for inversion of particle size distribution in spectral extinction technique[J]. Spectroscopy and Spectral Analysis, 2013, 33(3): 618-622. (in Chinese)
[5] Xu Lijun, Xin Lei, Cao Zhang. l(1)-Norm-Based reconstruction algorithm for particle sizing[J]. IEEE Transactions on Instrumention and Measurement, 2012, 61(5): 1395-1404.
[6] Wang Yanmin, Liang Guobiao, Pan Zhidong, Inversion of particle size distribution from light-scattering data using a modified regularization algorithm[J]. Particuology, 2010, 8(4): 365-371.
[7] Tang Hong. Retrieval of spherical particle size distribution with an improved Tikhonov iteration method[J]. Thermal Science, 2012, 16(5): 1400-1404.
[8] 邵阳, 王清华. 平滑 Chahine 迭代算法在光散射法粒度分布反演中的应用[J]. 南京晓庄学院学报, 2008, 11(6): 15-18.
Shao Yang, Wang Qinghua. Application of the smooth chahine algorithm in deducing the particle size distribution with light scattering[J]. Journal of Nanjing Xiaozhuang University, 2008, 11(6): 15-18. (in Chinese)
[9] Andreas Kirsch. An Introduction to the Mathematical Theory of Inverse Problems[M]. Berlin: Springer, 2011: 24-40.
[10] 李功胜, 袁忠信. 求解病态问题的一种新的优化正则化方法[J]. 郑州大学学报: 自然科学版, 1999, 31(4): 21-23.
Li Gongsheng, Yuan Zhongxin. A new class of optimal regularization methods for solving ill-posed problems[J]. Journal of Zhengzhou University, 1999, 31(4): 21-23. (in Chinese)
[11] Hansen P C. The L-curve and its Use in the Numerical Treatment of Inverse Problems[M]. Copenhagen: IMM, Department of Mathematical Modelling, Technical University of Denmark, 1999: 10-12.
[12] 王兵贤, 胡康秀, 王泽文. 反问题的Landweber迭代法及其应用研究进展[J]. 计算机应用研究, 2013, 30(9): 2583-2586
Wang Bingxian, Hu Kangxiu, Wang Zewen. Advances in research in Landweber iterate method for inverse problems and its application[J]. Journal of Shandong University of Technology, 2010, 24(4): 24-28. (in Chinese)
曹丽霞, 赵军, 孔明, 单良, 郭天太. 基于改进的Chahine迭代算法的粒径分布反演[J]. 红外与激光工程, 2015, 44(9): 2837. Cao Lixia, Zhao Jun, Kong Ming, Shan Liang, Guo Tiantai. Inversion of particle size distribution based on improved Chahine algorithm[J]. Infrared and Laser Engineering, 2015, 44(9): 2837.
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