Distributionally Robust Linear Regression With Block Lewis Weights

Abstract

We present an algorithm for the group distributionally robust (GDR) least squares problem. Given m groups, a parameter vector in Rd, and stacked design matrices and responses A and b, our algorithm obtains a (1+)-multiplicative optimal solution using O(\rank(A),m\1/3-2/3) linear-system-solves of matrices of the form ABA for block-diagonal B. Our technical methods follow from a recent geometric construction, block Lewis weights, that relates the empirical GDR problem to a carefully chosen least squares problem and an application of accelerated proximal methods. Our algorithm improves over known interior point methods for moderate accuracy regimes and matches the state-of-the-art guarantees for the special case of ∞ regression. We also give algorithms that smoothly interpolate between minimizing the average least squares loss and the distributionally robust loss.

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