Acceleration of the alternating least squares algorithm for principal components analysis

Principal components analysis (PCA) is a popular descriptive multivariate method for handling quantitative data and it can be extended to deal with qualitative data and mixed measurement level data. The existing algorithms for extended PCA are PRINCIPALS of Young et al. (1978) and PRINCALS of Gifi (...

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Vydané v:	Computational statistics & data analysis Ročník 55; číslo 1; s. 143 - 153
Hlavní autori:	Kuroda, Masahiro, Mori, Yuichi, Iizuka, Masaya, Sakakihara, Michio
Médium:	Journal Article
Jazyk:	English
Vydavateľské údaje:	Amsterdam Elsevier B.V 2011 Elsevier
Edícia:	Computational Statistics & Data Analysis
Predmet:	Acceleration Acceleration of convergence Algorithms Alternating least squares algorithm Alternating least squares algorithm Vector [epsilon] algorithm Acceleration of convergence PRINCIPALS PRINCALS Convergence Exact sciences and technology General topics Least squares method Mathematical analysis Mathematical models Mathematics Multivariate analysis Numerical analysis Numerical analysis. Scientific computation Numerical methods in probability and statistics PRINCALS Principal component analysis PRINCIPALS Probability and statistics Sciences and techniques of general use Statistics Vector [formula omitted] algorithm Vector ε algorithm Alternating least squares algorithm PRINCIPALS PRINCALS Acceleration of convergence Data analysis Convergence acceleration Estimation Iterative method Iteration Multivariate analysis Algorithm Convergence Convergence speed Selection problem Numerical analysis Statistical computation Least squares method Algorithm analysis Principal component analysis Variable selection
ISSN:	0167-9473, 1872-7352
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Popis
Shrnutí:	Principal components analysis (PCA) is a popular descriptive multivariate method for handling quantitative data and it can be extended to deal with qualitative data and mixed measurement level data. The existing algorithms for extended PCA are PRINCIPALS of Young et al. (1978) and PRINCALS of Gifi (1989) in which the alternating least squares algorithm is utilized. These algorithms based on the least squares estimation may require many iterations in their application to very large data sets and variable selection problems and may take a long time to converge. In this paper, we derive a new iterative algorithm for accelerating the convergence of PRINCIPALS and PRINCALS by using the vector ε algorithm of Wynn (1962). The proposed acceleration algorithm speeds up the convergence of the sequence of the parameter estimates obtained from PRINCIPALS or PRINCALS. Numerical experiments illustrate the potential of the proposed acceleration algorithm.
Bibliografia:	ObjectType-Article-2 SourceType-Scholarly Journals-1 ObjectType-Feature-1 content type line 23
ISSN:	0167-9473 1872-7352
DOI:	10.1016/j.csda.2010.06.001