English

Heterogeneous Wasserstein Discrepancy for Incomparable Distributions

Machine Learning 2021-10-14 v2 Machine Learning

Abstract

Optimal Transport (OT) metrics allow for defining discrepancies between two probability measures. Wasserstein distance is for longer the celebrated OT-distance frequently-used in the literature, which seeks probability distributions to be supported on the same\textit{same} metric space. Because of its high computational complexity, several approximate Wasserstein distances have been proposed based on entropy regularization or on slicing, and one-dimensional Wassserstein computation. In this paper, we propose a novel extension of Wasserstein distance to compare two incomparable distributions, that hinges on the idea of distributional slicing\textit{distributional slicing}, embeddings, and on computing the closed-form Wassertein distance between the sliced distributions. We provide a theoretical analysis of this new divergence, called heterogeneous Wasserstein discrepancy (HWD)\textit{heterogeneous Wasserstein discrepancy (HWD)}, and we show that it preserves several interesting properties including rotation-invariance. We show that the embeddings involved in HWD can be efficiently learned. Finally, we provide a large set of experiments illustrating the behavior of HWD as a divergence in the context of generative modeling and in query framework.

Keywords

Cite

@article{arxiv.2106.02542,
  title  = {Heterogeneous Wasserstein Discrepancy for Incomparable Distributions},
  author = {Mokhtar Z. Alaya and Gilles Gasso and Maxime Berar and Alain Rakotomamonjy},
  journal= {arXiv preprint arXiv:2106.02542},
  year   = {2021}
}
R2 v1 2026-06-24T02:50:39.951Z