Bayesian Variable Selection for Linear Regression with the -G Priors

Abstract

In this paper, we introduce a new methodology for Bayesian variable selection in linear regression that is independent of the traditional indicator method. A diagonal matrix G is introduced to the prior of the coefficient vector β, with each of the gj's, bounded between 0 and 1, on the diagonal serves as a stabilizer of the corresponding βj. Mathematically, a promising variable has a gj value that is close to 0, whereas the value of gj corresponding to an unpromising variable is close to 1. This property is proven in this paper under orthogonality together with other asymptotic properties. Computationally, the sample path of each gj is obtained through Metropolis-within-Gibbs sampling method. Also, in this paper we give two simulations to verify the capability of this methodology in variable selection.