Statistical Inference for Linear Functionals of Online SGD in High-dimensional Linear Regression

Abstract

Stochastic gradient descent (SGD) has emerged as the quintessential method in a data scientist's toolbox. Using SGD for high-stakes applications requires, however, careful quantification of the associated uncertainty. Towards that end, in this work, we establish a high-dimensional Central Limit Theorem (CLT) for linear functionals of online SGD iterates for overparametrized least-squares regression with non-isotropic Gaussian inputs. We first show that a bias-corrected CLT holds when the number of iterations of the online SGD, t, grows sub-linearly in the dimensionality, d. In order to use the developed result in practice, we further develop an online approach for estimating the variance term appearing in the CLT, and establish high-probability bounds for the developed online estimator. Together with the CLT result, this provides a fully online and data-driven way to numerically construct confidence intervals. This enables practical high-dimensional algorithmic inference with SGD and to the best of our knowledge, is the first such result.