2014
NIPS
NeurIPS 2014
An Accelerated Proximal Coordinate Gradient Method
Abstract
We develop an accelerated randomized proximal coordinate gradient (APCG) method, for solving a broad class of composite convex optimization problems. In particular, our method achieves faster linear convergence rates for minimizing strongly convex functions than existing randomized proximal coordinate gradient methods. We show how to apply the APCG method to solve the dual of the regularized empirical risk minimization (ERM) problem, and devise efficient implementations that can avoid full-dimensional vector operations. For ill-conditioned ERM problems, our method obtains improved convergence rates than the state-of-the-art stochastic dual coordinate ascent (SDCA) method.
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— Machine Learning and Mathematics & Optimization
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Hot Topic Early Bird
— stochastic optimization
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— 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
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Trend Setter
— Neural Network Optimization
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Keyword Pioneer
— accelerated method
Authors
Topics
Machine Learning > Optimization & Theory > Optimization
Mathematics & Optimization > Optimization > Continuous Optimization
Mathematics & Optimization > Optimization > Stochastic Methods
Machine Learning > Optimization & Theory > Stochastic Methods
Deep Learning > Optimization & Theory > Neural Network Optimization
Deep Learning > Optimization & Theory > Optimization
Mathematics & Optimization > Optimization > Convex Optimization
Keywords
stochastic optimization
convex optimization
accelerated optimization
empirical risk minimization
coordinate descent
strongly convex
proximal gradient method
linear convergence
proximal gradient
dual coordinate ascent
proximal algorithm
accelerated method
composite convex optimization
proximal coordinate gradient