Convergence properties of data augmentation algorithms for high-dimensional robit regression

TL;DR

This paper proves that the data augmentation algorithm for high-dimensional robit regression is geometrically ergodic under very general conditions, ensuring reliable Bayesian inference even when the number of predictors exceeds the sample size.

Contribution

It establishes trace-class and geometric ergodicity properties of the robit DA Markov chain for arbitrary sample sizes and predictor dimensions, extending previous results.

Findings

The robit DA chain is trace-class for all sample sizes and predictor counts.

Trace-class property implies geometric ergodicity of the chain.

The sandwich robit chain outperforms the standard DA chain in convergence.

Abstract

The logistic and probit link functions are the most common choices for regression models with a binary response. However, these choices are not robust to the presence of outliers/unexpected observations. The robit link function, which is equal to the inverse CDF of the Student's $t$-distribution, provides a robust alternative to the probit and logistic link functions. A multivariate normal prior for the regression coefficients is the standard choice for Bayesian inference in robit regression models. The resulting posterior density is intractable and a Data Augmentation (DA) Markov chain is used to generate approximate samples from the desired posterior distribution. Establishing geometric ergodicity for this DA Markov chain is important as it provides theoretical guarantees for asymptotic validity of MCMC standard errors for desired posterior expectations/quantiles. Previous work [Roy(2012)] established geometric ergodicity of this robit DA Markov chain assuming (i) the sample size $n$ dominates the number of predictors $p$, and (ii) an additional constraint which requires the sample size to be bounded above by a fixed constant which depends on the design matrix $X$. In particular, modern high-dimensional settings where $n < p$ are not considered. In this work, we show that the robit DA Markov chain is trace-class (i.e., the eigenvalues of the corresponding Markov operator are summable) for arbitrary choices of the sample size $n$, the number of predictors $p$, the design matrix $X$, and the prior mean and variance parameters. The trace-class property implies geometric ergodicity. Moreover, this property allows us to conclude that the sandwich robit chain (obtained by inserting an inexpensive extra step in between the two steps of the DA chain) is strictly better than the robit DA chain in an appropriate sense.