An optimal first-order method for smooth and strongly convex composite optimization and its stationary limit

Abstract

We introduce Prox-ITEM, an optimal proximal gradient method for minimizing f+g, where f is smooth and strongly convex, and g is convex, proper, and lower semicontinuous. In the smooth case g=0, Prox-ITEM reduces to the information-theoretic exact method (ITEM). We prove an exact distance-to-solution bound for Prox-ITEM with the same distance-convergence rate as ITEM, and show that this rate is minimax optimal among span-based first-order methods using the same number of gradient-oracle calls for f and an arbitrary number of proximal-oracle calls for g. We also identify the stationary limit of Prox-ITEM, denoted Prox-TMM, which gives a proximal extension of the triple momentum method (TMM) to the composite setting and achieves the corresponding TMM distance-convergence rate.