Robust nonlinear principal components
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- 作者:Ricardo A. Maronna ; Fernanda Méndez ; Víctor J. Yohai
- 关键词:S ; estimators ; Splines ; Principal curves
- 刊名:Statistics and Computing
- 出版年:2015
- 出版时间:March 2015
- 年:2015
- 卷:25
- 期:2
- 页码:439-448
- 全文大小:475 KB
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Fernanda Méndez (2)
Víctor J. Yohai (3)
1. Faculty of Exact Sciences, University of La Plata, C.C. 172, 1900, La Plata, Argentina
2. Faculty of Economic Science and Statistics, University of Rosario, Bv. Oro?o 1261, 2000, Rosario, Argentina
3. Departamento de Matemática, Faculty of Natural and Exact Sciences, Universidad de Buenos Aires, Ciudad Universitaria, Pabellon 1, 1428, Buenos Aires, Argentina- 刊物类别:Mathematics and Statistics
- 刊物主题:Statistics
Statistics Computing and Software
Statistics
Numeric Computing
Mathematics
Artificial Intelligence and Robotics- 出版者:Springer Netherlands
- ISSN:1573-1375
- 作者单位:Ricardo A. Maronna (1)
文摘
All known approaches to nonlinear principal components are based on minimizing a quadratic loss, which makes them sensitive to data contamination. A?predictive approach in which a spline curve is fit minimizing a residual M-scale is proposed for this problem. For a p-dimensional random sample x i (i=1,-n) the method finds a function h:R?em class="a-plus-plus">R p and a set {t 1,-t n }⊿em class="a-plus-plus">R that minimize a joint M-scale of the residuals x i ?strong class="a-plus-plus">h(t i ), where h ranges on the family of splines with a given number of knots. The computation of the curve then becomes the iterative computing of regression S-estimators. The starting values are obtained from a robust linear principal components estimator. A?simulation study and the analysis of a real data set indicate that the proposed approach is almost as good as other proposals for row-wise contamination, and is better for element-wise contamination.