An Optimal Algorithm for Strongly Convex Min-min Optimization

Abstract

In this paper we study the smooth strongly convex minimization problem xy f(x,y). The existing optimal first-order methods require O(\x,y\ 1/ε) of computations of both ∇x f(x,y) and ∇y f(x,y), where x and y are condition numbers with respect to variable blocks x and y. We propose a new algorithm that only requires O(x 1/ε) of computations of ∇x f(x,y) and O(y 1/ε) computations of ∇y f(x,y). In some applications x y, and computation of ∇y f(x,y) is significantly cheaper than computation of ∇x f(x,y). In this case, our algorithm substantially outperforms the existing state-of-the-art methods.

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