Accelerated Mirror Descent in Continuous and Discrete Time

Walid Krichene; Alexandre Bayen; Peter L. Bartlett; Peter L Bartlett

2015 NIPS NeurIPS 2015

Accelerated Mirror Descent in Continuous and Discrete Time

Abstract

We study accelerated mirror descent dynamics in continuous and discrete time. Combining the original continuous-time motivation of mirror descent with a recent ODE interpretation of Nesterov's accelerated method, we propose a family of continuous-time descent dynamics for convex functions with Lipschitz gradients, such that the solution trajectories are guaranteed to converge to the optimum at a $O(1/t^2)$ rate. We then show that a large family of first-order accelerated methods can be obtained as a discretization of the ODE, and these methods converge at a $O(1/k^2)$ rate. This connection between accelerated mirror descent and the ODE provides an intuitive approach to the design and analysis of accelerated first-order algorithms.

🌉 Interdisciplinary Bridge — Machine Learning and Mathematics & Optimization

🧭 Keyword Pioneer — ode discretization

🐣 Hot Topic Early Bird — continuous optimization

🐝 Cross-Pollinator — Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Robotics, Security & Privacy, Speech & Audio

Authors

Walid Krichene , Alexandre Bayen , Peter L. Bartlett , Peter L Bartlett

Topics

Machine Learning > Optimization & Theory > Neural Network Optimization Machine Learning > Optimization & Theory > Optimization Mathematics & Optimization > Optimization > Continuous Optimization Mathematics & Optimization > Optimization > Optimization Mathematics & Optimization > Optimization > Convex Optimization

Keywords

convex optimization continuous optimization mirror descent accelerated gradient continuous time first-order method nesterov acceleration ode discretization

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