Nowadays, a relevant challenge regards the assessment of a global measure of well-being by using composite indicators of different features such as level of wealth, comfort, material goods, quality and availability of education, living standard, etc. The employ of a unique measure, as a consensus of several indicators, in general allows to better understand and synthesize the underlying processes with a more accurate picture of the social progress and it is useful for giving a better information to citizens and policy makers. In this paper, we focus on statistical methodologies designed to build composite indicators of well-being by detecting latent components and assessing the statistical relationships among indicators. We will consider Principal Component Analysis (PCA) and a constrained PCA version, which allows to specify disjoint classes of variables with an associated component of maximal variance. Furthermore, we will take into account the Structural Equation Model (SEM)
Dimensions of well-being and their statistical measurements / Ferrara, Carla; Martella, Francesca; Vichi, Maurizio. - STAMPA. - (2012), pp. 240-244. (Intervento presentato al convegno Making decisions: the role of statistics for knowledge and governance tenutosi a Rome nel 19-20 april 2012).
Dimensions of well-being and their statistical measurements
FERRARA, CARLA;MARTELLA, Francesca;VICHI, Maurizio
2012
Abstract
Nowadays, a relevant challenge regards the assessment of a global measure of well-being by using composite indicators of different features such as level of wealth, comfort, material goods, quality and availability of education, living standard, etc. The employ of a unique measure, as a consensus of several indicators, in general allows to better understand and synthesize the underlying processes with a more accurate picture of the social progress and it is useful for giving a better information to citizens and policy makers. In this paper, we focus on statistical methodologies designed to build composite indicators of well-being by detecting latent components and assessing the statistical relationships among indicators. We will consider Principal Component Analysis (PCA) and a constrained PCA version, which allows to specify disjoint classes of variables with an associated component of maximal variance. Furthermore, we will take into account the Structural Equation Model (SEM)I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.