In this work we address the data reduction problem for fuzzy data. In particular, following a possibilistic approach, several component models for handling two- and three-way fuzzy data sets are introduced. The two-way models are based on classical Principal Component Analysis (PCA), whereas the three-way ones on three-way generalizations of PCA, as Tucker3 and CANDECOMP/PARAFAC. The here-proposed models exploit the potentiality of the possibilistic regression. In fact, the component models for fuzzy data can be seen as particular regression analyses between a set of observed fuzzy variables (response variables) and a set of unobservable crisp variables (explanatory variables). In order to show how the models work, the results of an application to a three-way fuzzy data set are illustrated.
Two- and three-way component models for LR fuzzy data in a possibilistic framework / Giordani, Paolo. - In: FUZZY SETS AND SYSTEMS. - ISSN 0165-0114. - 157:19(2006), pp. 2648-2664. [10.1016/j.fss.2004.12.012]
Two- and three-way component models for LR fuzzy data in a possibilistic framework
GIORDANI, Paolo
2006
Abstract
In this work we address the data reduction problem for fuzzy data. In particular, following a possibilistic approach, several component models for handling two- and three-way fuzzy data sets are introduced. The two-way models are based on classical Principal Component Analysis (PCA), whereas the three-way ones on three-way generalizations of PCA, as Tucker3 and CANDECOMP/PARAFAC. The here-proposed models exploit the potentiality of the possibilistic regression. In fact, the component models for fuzzy data can be seen as particular regression analyses between a set of observed fuzzy variables (response variables) and a set of unobservable crisp variables (explanatory variables). In order to show how the models work, the results of an application to a three-way fuzzy data set are illustrated.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
