English

Supervised learning of sheared distributions using linearized optimal transport

Statistics Theory 2022-01-27 v1 Optimization and Control Machine Learning Statistics Theory

Abstract

In this paper we study supervised learning tasks on the space of probability measures. We approach this problem by embedding the space of probability measures into L2L^2 spaces using the optimal transport framework. In the embedding spaces, regular machine learning techniques are used to achieve linear separability. This idea has proved successful in applications and when the classes to be separated are generated by shifts and scalings of a fixed measure. This paper extends the class of elementary transformations suitable for the framework to families of shearings, describing conditions under which two classes of sheared distributions can be linearly separated. We furthermore give necessary bounds on the transformations to achieve a pre-specified separation level, and show how multiple embeddings can be used to allow for larger families of transformations. We demonstrate our results on image classification tasks.

Keywords

Cite

@article{arxiv.2201.10590,
  title  = {Supervised learning of sheared distributions using linearized optimal transport},
  author = {Varun Khurana and Harish Kannan and Alexander Cloninger and Caroline Moosmüller},
  journal= {arXiv preprint arXiv:2201.10590},
  year   = {2022}
}
R2 v1 2026-06-24T09:02:37.163Z