The Common-directions Method for Regularized Empirical Risk Minimization

Po-Wei Wang; Ching-pei Lee; Chih-Jen Lin

2019 JMLR JMLR 2019

The Common-directions Method for Regularized Empirical Risk Minimization

Abstract

State-of-the-art first- and second-order optimization methods are able to achieve either fast global linear convergence rates or quadratic convergence, but not both of them. In this work, we propose an interpolation between first- and second-order methods for regularized empirical risk minimization that exploits the problem structure to efficiently combine multiple update directions. Our method attains both optimal global linear convergence rate for first-order methods, and local quadratic convergence. Experimental results show that our method outperforms state-of-the-art first- and second-order optimization methods in terms of the number of data accesses, while is competitive in training time. [abs] [ pdf ][ bib ] © JMLR 2019. (edit, beta)

🐝 Cross-Pollinator — Artificial Intelligence, Computer Science, Data Science & Analytics, Deep Learning, Machine Learning, Mathematics & Optimization, Reinforcement Learning, Security & Privacy, Speech & Audio

🌉 Interdisciplinary Bridge — Machine Learning and Mathematics & Optimization

Authors

Po-Wei Wang , Ching-pei Lee , Chih-Jen Lin

Topics

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

Keywords

empirical risk minimization second-order optimization linear convergence first-order method second-order method first-order optimization quadratic convergence

Download PDF

Related papers

Adaptation Based on Generalized Discrepancy 2019

Iterated Learning in Dynamic Social Networks 2019

Pyro: Deep Universal Probabilistic Programming 2019

Matched Bipartite Block Model with Covariates 2019

Approximation Hardness for A Class of Sparse Optimization Problems 2019