The paper targets the estimation of a poverty rate at the upazila level in Bangladesh through the use of demographic and health survey (DHS) data. Upazilas are administrative regions equivalent to counties or boroughs whose sample sizes are not large enough to provide reliable estimates or are even absent. We tackle this issue by proposing a small-area estimation model complementing survey data with remote sensing information at the area level. We specify an extended Beta mixed regression model within the Bayesian framework, allowing it to accommodate the peculiarities of sample data and to predict out-of-sample rates. Specifically, it enables to include estimates equal to either 0 or 1 and to model the strong intra-cluster correlation. We aim at proposing a method that can be implemented by statistical offices as a routine. In this spirit we consider a regularizing prior for coefficients, rather than a model selection approach, to deal with a large number of auxiliary variables. We compare our methods with existing alternatives using a design-based simulation exercise and illustrate its potential with the motivating application.
De Nicolo, S., Fabrizi, E., Gardini, A., EXTENDED BETA MODELS FOR POVERTY MAPPING. AN APPLICATION INTEGRATING SURVEY AND REMOTE SENSING DATA IN BANGLADESH, <<THE ANNALS OF APPLIED STATISTICS>>, 2024; 18 (4): 3229-3252. [doi:10.1214/24-AOAS1934] [https://hdl.handle.net/10807/300844]
EXTENDED BETA MODELS FOR POVERTY MAPPING. AN APPLICATION INTEGRATING SURVEY AND REMOTE SENSING DATA IN BANGLADESH
Fabrizi, Enrico;
2024
Abstract
The paper targets the estimation of a poverty rate at the upazila level in Bangladesh through the use of demographic and health survey (DHS) data. Upazilas are administrative regions equivalent to counties or boroughs whose sample sizes are not large enough to provide reliable estimates or are even absent. We tackle this issue by proposing a small-area estimation model complementing survey data with remote sensing information at the area level. We specify an extended Beta mixed regression model within the Bayesian framework, allowing it to accommodate the peculiarities of sample data and to predict out-of-sample rates. Specifically, it enables to include estimates equal to either 0 or 1 and to model the strong intra-cluster correlation. We aim at proposing a method that can be implemented by statistical offices as a routine. In this spirit we consider a regularizing prior for coefficients, rather than a model selection approach, to deal with a large number of auxiliary variables. We compare our methods with existing alternatives using a design-based simulation exercise and illustrate its potential with the motivating application.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.