This paper deals with the variable selection problem in linear regression models and its solution by means of Bayes factors. If substantive prior information is lacking or impractical to elicit, which is often the case in applications, objective Bayes factors come into play. These can be obtained by means of different methods, featuring Zellner-Siow priors, fractional Bayes factors and intrinsic priors. The paper reviews such methods and investigates their finite-sample ability to identify the simplest model supported by the data, introducing the notion of full discrimination power. The results obtained are relevant to structural learning of Gaussian DAG models, where large spaces of sets of recursive linear regressions are to be explored.
A Comparison of Objective Bayes Factors for Variable Selection in Linear Regression Models / LA ROCCA, Luca. - STAMPA. - (2013), pp. 181-189. (Intervento presentato al convegno 8th Biannual Meeting of the Classification and Data Analysis Group, CLADAG 2011 tenutosi a Pavia, ita nel 2011) [10.1007/978-3-319-00032-9_21].
A Comparison of Objective Bayes Factors for Variable Selection in Linear Regression Models
LA ROCCA, Luca
2013
Abstract
This paper deals with the variable selection problem in linear regression models and its solution by means of Bayes factors. If substantive prior information is lacking or impractical to elicit, which is often the case in applications, objective Bayes factors come into play. These can be obtained by means of different methods, featuring Zellner-Siow priors, fractional Bayes factors and intrinsic priors. The paper reviews such methods and investigates their finite-sample ability to identify the simplest model supported by the data, introducing the notion of full discrimination power. The results obtained are relevant to structural learning of Gaussian DAG models, where large spaces of sets of recursive linear regressions are to be explored.
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