On the shape of posterior densities and credible sets in instrumental variable regression models with reduced rank: an application of flexible sampling methods using neural networks

Abstract

Likelihoods and posteriors of instrumental variable regression models with strongendogeneity and/or weak instruments may exhibit rather non-elliptical contours inthe parameter space. This may seriously affect inference based on Bayesian crediblesets. When approximating such contours using Monte Carlo integration methods likeimportance sampling or Markov chain Monte Carlo procedures the speed of the algorithmand the quality of the results greatly depend on the choice of the importance orcandidate density. Such a density has to be `close' to the target density in order toyield accurate results with numerically efficient sampling. For this purpose we introduce neural networks which seem to be natural importance or candidate densities, as they have a universal approximation property and are easy to sample from.A key step in the proposed class of methods is the construction of a neural network that approximates the target density accurately. The methods are tested on a set ofillustrative models. The results indicate the feasibility of the neural networkapproach.Markov chain Monte Carlo;Bayesian inference;credible sets;importance sampling;instrumental variables;neural networks;reduced rank