2012
NIPS
NeurIPS 2012
Learning Probability Measures with respect to Optimal Transport Metrics
Abstract
We study the problem of estimating, in the sense of optimal transport metrics, a measure which is assumed supported on a manifold embedded in a Hilbert space. By establishing a precise connection between optimal transport metrics, optimal quantization, and learning theory, we derive new probabilistic bounds for the performance of a classic algorithm in unsupervised learning (k-means), when used to produce a probability measure derived from the data. In the course of the analysis, we arrive at new lower bounds, as well as probabilistic bounds on the convergence rate of the empirical law of large numbers, which, unlike existing bounds, are applicable to a wide class of measures.
🌉
Interdisciplinary Bridge
— Data Science & Analytics and Machine Learning
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Keyword Pioneer
— optimal transport metrics
🐣
Hot Topic Early Bird
— unsupervised learning
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Cross-Pollinator
— Artificial Intelligence, Computer Science, Computer Vision, Data Science & Analytics, Deep Learning, Healthcare & Medicine, Interdisciplinary, Machine Learning, Mathematics & Optimization, Natural Language Processing, Reinforcement Learning, Speech & Audio
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Trend Setter
— Optimal Transport
Authors
Topics
Machine Learning > Core Methods > Clustering
Machine Learning > Optimization & Theory > Learning Theory
Machine Learning > Optimization & Theory > Statistical Learning
Machine Learning > Optimization & Theory > Theory
Data Science & Analytics > Methods > Time Series Analysis
Data Science & Analytics > Applications > Clustering
Machine Learning > Bayesian & Probabilistic > Probabilistic Modeling
Mathematics & Optimization > Optimization > Optimal Transport