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2021 ICML ICML 2021

Riemannian Convex Potential Maps

Abstract

Modeling distributions on Riemannian manifolds is a crucial component in understanding non-Euclidean data that arises, e.g., in physics and geology. The budding approaches in this space are limited by representational and computational tradeoffs. We propose and study a class of flows that uses convex potentials from Riemannian optimal transport. These are universal and can model distributions on any compact Riemannian manifold without requiring domain knowledge of the manifold to be integrated into the architecture. We demonstrate that these flows can model standard distributions on spheres, and tori, on synthetic and geological data.

🌉 Interdisciplinary Bridge — Deep Learning and Machine Learning and Mathematics & Optimization
🧭 Keyword Pioneer — convex potential
🐝 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

Samuel Cohen , Brandon Amos , Yaron Lipman

Topics

Machine Learning > Core Methods > Representation Learning Deep Learning > Models > Generative Models Mathematics & Optimization > Mathematics > Geometry Mathematics & Optimization > Optimization > Continuous Optimization Mathematics & Optimization > Optimization > Optimal Transport

Keywords

convex optimization optimal transport probability distribution riemannian manifold generative model normalizing flow convex potential
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