2010
NIPS
NeurIPS 2010
Practical Large-Scale Optimization for Max-norm Regularization
Abstract
The max-norm was proposed as a convex matrix regularizer by Srebro et al (2004) and was shown to be empirically superior to the trace-norm for collaborative filtering problems. Although the max-norm can be computed in polynomial time, there are currently no practical algorithms for solving large-scale optimization problems that incorporate the max-norm. The present work uses a factorization technique of Burer and Monteiro (2003) to devise scalable first-order algorithms for convex programs involving the max-norm. These algorithms are applied to solve huge collaborative filtering, graph cut, and clustering problems. Empirically, the new methods outperform mature techniques from all three areas.
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Trend Setter
— Efficient Computing
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Keyword Pioneer
— max-norm regularization
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Cross-Pollinator
— Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Knowledge & Reasoning, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Robotics, Security & Privacy
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Interdisciplinary Bridge
— Machine Learning and Mathematics & Optimization
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Hot Topic Early Bird
— matrix factorization
Authors
Topics
Machine Learning > Core Methods > Clustering
Machine Learning > Optimization & Theory > Optimization
Machine Learning > Application Areas > Efficient Computing
Machine Learning > Core Methods > Matrix Factorization
Mathematics & Optimization > Optimization > Convex Optimization
Machine Learning > Learning Types > Sparse Learning