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    Volume 38 Issue 2
    Mar.  2013
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    Article Navigation >  Earth Science  > 2013  >  38(2): 431-440
    ZENG Meng-xiu, SONG You-gui, 2013. Application of the Levenberg-Marquardt Algorithm to X-Ray Diffraction Quantitative Phase Analysis. Earth Science, 38(2): 431-440. doi: 10.3799/dqkx.2013.043
    Citation: ZENG Meng-xiu, SONG You-gui, 2013. Application of the Levenberg-Marquardt Algorithm to X-Ray Diffraction Quantitative Phase Analysis. Earth Science, 38(2): 431-440. doi: 10.3799/dqkx.2013.043
    shu

    Application of the Levenberg-Marquardt Algorithm to X-Ray Diffraction Quantitative Phase Analysis

    doi: 10.3799/dqkx.2013.043
    • 1.

      State Key Laboratory of Loess and Quaternary Geology, Institute of Earth Environment, Chinese Academy of Sciences, Xi'an710075, China

    • 2.

      Graduate University of the Chinese Academy of Sciences, Beijing100049, China

    • Received Date: 2012-02-25
    • Publish Date: 2013-02-01
      Abstract
    • The conventional X-ray diffraction quantitative phase analysis methods are over-reliant on pure standard substances, working curve and K value. If the phases are more than 3, the fitting results are not good by Rietveld method. In addition, the versatility of quantitative methods with large calculation and fussy operation also need to be expanded. A new non-standard quantitative phase analysis method based on nonlinear model parameters estimation method of 4 modular redundant systems that consist of Levenberg-Marquardt, Particle Swarm Optimization, Genetic Algorithm and Differential Evolution is proposed. Taking the content of 4 phases in 19 mixture powder as the original data, performing the whole process of computing in the Matlab environment, the experimental results show that the Levenberg-Marquardt algorithm is an effective tool with smaller computing complexity, faster convergence speed and better global searching capability and other advantages. It is no need to add reference phase to the samples, which overcomes the problems that all the samples must be determined more than one time, and the method with no need for K value which enlarges the applications and enhances the accuracy of the X-ray diffraction method for quantitative phase analysis of the mixture samples. Replacing the conventional specific single spectrum line intensity or intensity rations by the sum of the integrated intensity of the top three peaks can improve the precision of the X-ray diffraction quantitative phase analysis. With this method, the content of Corundum in 82 samples of Zhaosu section in Ili basin and 359 samples in ELJ drilling core of ICDP in Qinghai Lake are computed. The correlation coefficient of the match ratio and the calculated value of Corundum in Zhaosu section and ELJ drilling core have reached 0.83 and 0.63. Practice has proved that it is a feasible, effective, rapid and correct technique of quantitative analysis of minerals, and the stability is satisfactory. It can be used for quantifying the phases in more than 9-phase materials.

       

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    • Alexander, L., Klug, H. P., 1948. Basic Aspects of X-Ray Absorption in Quantitative Diffraction Analysis of Powder Mixtures. Analyses Chemical, 20(10): 886-894. doi: 10.1021/ac60022a002
      Al-Jaroudi, S.S., Ul-Hamid, A., Mohammed, A.R.I., et al., 2007. Use of X-Ray Powder Diffraction for Quantitative Analysis of Carbonate Rock Reservoir Samples. Powder Technology, 175(3): 115-121. doi: 10.1016/j.powtec.2007.01.013
      An, Z.S., Ai, L., Song, Y.G., et al., 2006. Lake Qinghai Scientific Drilling Project. Scientific Drilling, 2: 20-22. doi: 10.2204/iodp.sd.1.05.2006
      Chu, G., Zhai, X.J., Fu, Y., et al., 2004. The Multi-Peak Match Intensity Ratio Method for X-Ray Diffraction Quantitative Phase Analysis. Journal of Instrumental Analysis, 23(1): 48-51 (in Chinese with English abstract). http://www.labpku.com/UploadFiles/2014-01/admin/2014011613351765553.pdf
      Fan, J.Y., 2005. A Modified Levenberg-Marquardt Algorithm for Singular System of Nonlinear Equations. Journal of Computational Mathematics, 21(5): 625-636. doi: cnki:ISSN:0254-9409.0.2003-05-007
      Fang, Q., Chen, D.Z., Yu, H.J., et al., 2004. The Application of Differential Evolution Algorithm Based on Dugenic Strategy and ITS in Chemical Engineering. Journal of Chemical Industry and Engineering, 55(4): 598-602 (in Chinese with English abstract).
      Ge, J.K., Qiu, Y.H., Wu, C.M., et al., 2008. A Research Review on Genetic Algorithms. Application Research of Computers, 25(10): 2911-2916 (in Chinese with English abstract).
      Hill, R.J., Howard, C.J., 1987. Quantitative Phase Analysis from Neutron Powder Diffraction Data Using the Rietveld Method. Journal of Application Crystal, 20: 467-474. doi: 10.1107/S0021889887086199
      Jin, Y., Sun, X.S., Xue, Q., 2008. X-Ray Diffraction Analysis Technology. National University of Defence Technology Press, Beijing, 193-203 (in Chinese).
      Kennedy, J., Eberhart, R., 1995. Particle Swarm Optimization. IEEE International Conference on Neural Networks. IEEE Service Center, Piscataway, 4: 1942-1948. doi: 10.1109/ICNN.1995.488968
      Li, G., Ma, H.W., Wang, H.L., et al., 2011. Modal Analysis of Montmorillonite in Bentonites Using Phase Mixing Equation: A Comparative Study. Earth Science Frontiers, 18(1): 216-221 (in Chinese with English abstract). http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.948.6939&rep=rep1&type=pdf
      Liu, S.Z., 2001. The Tactics Construction of Quantitative Phase Analysis by X-Ray Diffraction. Rock and Mineral Analysis, 20(2): 81-87 (in Chinese with English abstract). http://en.cnki.com.cn/Article_en/CJFDTOTAL-YKCS200102000.htm
      Ma, L.D., 1996. A New Method of X-Ray Powder Diffraction-Rietveld Whole Pattern Fitting. Progrress in Physics, 16(2): 251-265 (in Chinese with English abstract). http://en.cnki.com.cn/Article_en/CJFDTOTAL-WLXJ602.004.htm
      Song, Y.G., Shi, Z.T., Fang, X.M., et al., 2010. Loess Magnetic Properties in the Ili Basin and Their Correlation with the Chinese Loess Plateau. Science China Earth Sciences, 53(3): 419-431. doi: 10.1007/s11430-010-0011-5
      Storn, R., Price, K., 1997. Differential Evolution—A Simple and Efficient Heuristic for Global Optimization over Continuous Spaces. Journal of Global Optimization, 11(4): 341-359. doi: 10.1023/A:1008202821328
      Tongji University Computing Mathematics Staff Room, 2004. Modern Numerical Mathematics and Computation. Tongji University Press, Shanghai, 78-89 (in Chinese).
      Wan, H.B., Liao, L.B., 2009. Quantitative Phase Analysis of Montmorillonite in Bentonite. Journal of the Chinese Ceramic Society, 37(12): 2055-2060 (in Chinese with English abstract). http://en.cnki.com.cn/Article_en/CJFDTOTAL-GXYB200912018.htm
      Wiles, D.B., Young, R.A., 1981. A New Computer Program for Rietveld Analysis of X-Ray Powder Diffraction Patterns. Journal of Applied Crystallography, 14: 149-151. doi: 10.1107/S0021889881008996
      Xie, X.F., Zhang, W.J., Yang, Z.L., 2003. Overview of Particle Swam Optimization. Control and Decision, 18(2): 129-134 (in Chinese with English abstract). http://www.scientific.net/AMM.543-547.1597
      Xu, J.L., Li, Y.W., Chen, T.S., 2009. Rietveld Method Used in Quantify the Content of Solid Solution in Mullite. Refractories, 43(4): 303-305 (in Chinese with English abstract).
      Zou, L.C., Wang, S.M., 2011. Empirical Creep Model Used in Slipped Zone Soil of Gushubao Landlide. Journal of Engineering Geology, 19(1): 59-64 (in Chinese with English abstract). http://en.cnki.com.cn/Article_en/CJFDTOTAL-GCDZ201101012.htm
      储刚, 翟秀静, 符岩, 等, 2004. X射线衍射多谱峰匹配强度比定量相分析方法. 分析测试学报, 23(1): 48-51. https://www.cnki.com.cn/Article/CJFDTOTAL-TEST200401012.htm
      方强, 陈德钊, 俞欢军, 等, 2004. 基于优进策略的差分进化算法及其化工应用. 化工学报, 55(4): 598-602. doi: 10.3321/j.issn:0438-1157.2004.04.019
      葛继科, 邱玉辉, 吴春明, 等, 2008. 遗传算法研究综述. 计算机应用研究, 25(10): 2911-2916. doi: 10.3969/j.issn.1001-3695.2008.10.008
      晋勇, 孙小松, 薛屺, 2008. X射线衍射分析技术. 北京: 国防科技大学出版社, 193-203.
      李歌, 马鸿文, 王红丽, 等, 2011. 相混合计算法确定蒙脱石含量的对比研究. 地学前缘, 18(1): 216-221. https://www.cnki.com.cn/Article/CJFDTOTAL-DXQY201101031.htm
      刘仕子, 2001. X射线衍射定量相分析的策略架构. 岩矿测试, 20(2): 81-87. https://www.cnki.com.cn/Article/CJFDTOTAL-YKCS200102000.htm
      马礼敦, 1996. X射线粉末衍射的新起点——Rietveld全谱拟合. 物理学进展, 16(2): 251-265. doi: 10.3321/j.issn:1000-0542.1996.02.005
      同济大学计算数学教研室, 2004. 现代数值数学和计算. 上海: 同济大学出版社, 78-89.
      万红波, 廖立兵, 2009. 膨润土中蒙脱石物相的定量分析. 硅酸盐学报, 37(12): 2055-2060. doi: 10.3321/j.issn:0454-5648.2009.12.017
      谢晓峰, 张文俊, 杨之廉, 2003. 微粒群算法综述. 控制与决策, 18(2): 129-134. https://www.cnki.com.cn/Article/CJFDTOTAL-KZYC200302000.htm
      许聚良, 李亚伟, 陈汀水, 2009. Rietveld全谱拟合法测定莫来石固溶体含量. 耐火材料, 43(4): 303-305. doi: 10.3969/j.issn.1001-1935.2009.04.019
      邹良超, 王世梅, 2011. 古树包滑坡滑带土蠕变经验模型. 工程地质学报, 19(1): 59-64. https://www.cnki.com.cn/Article/CJFDTOTAL-GCDZ201101012.htm
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