Mirror Duality in Convex Optimization
Abstract
While first-order optimization methods are usually designed to efficiently reduce the function value f(x), there has been recent interest in methods efficiently reducing the magnitude of ∇ f(x), and the findings show that the two types of methods exhibit a certain symmetry. In this work, we present mirror duality, a one-to-one correspondence between mirror-descent-type methods reducing function value and reducing gradient magnitude. Using mirror duality, we obtain the dual accelerated mirror descent (dual-AMD) method that efficiently reduces *(∇ f(x)), where is a distance-generating function and * quantifies the magnitude of ∇ f(x). We then apply dual-AMD to efficiently reduce \|∇ f(·) \|q for q∈ [2,∞) and to efficiently compute -approximate solutions of the optimal transport problem.
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