Subspace Detours Meet Gromov-Wasserstein

In the context of optimal transport methods, the subspace detour approach was recently presented by Muzellec and Cuturi (2019). It consists in building a nearly optimal transport plan in the measures space from an optimal transport plan in a wisely chosen subspace, onto which the original measures are projected. The contribution of this paper is to extend this category of methods to the Gromov-Wasserstein problem, which is a particular type of transport distance involving the inner geometry of the compared distributions. After deriving the associated formalism and properties, we also discuss a specific cost for which we can show connections with the Knothe-Rosenblatt rearrangement. We finally give an experimental illustration on a shape matching problem.

Domaines

Méthodologie [stat.ME] Traitement du signal et de l'image [eess.SP] Applications [stat.AP] Calcul [stat.CO]

François Septier : Connectez-vous pour contacter le contributeur

https://hal.science/hal-03426813

Soumis le : vendredi 12 novembre 2021-15:38:57

Dernière modification le : jeudi 11 avril 2024-09:22:26

Dates et versions

hal-03426813 , version 1 (12-11-2021)

Identifiants

HAL Id : hal-03426813 , version 1
ARXIV : 2110.10932

Citer

Clément Bonet, Nicolas Courty, François Septier, Lucas Drumetz. Subspace Detours Meet Gromov-Wasserstein. NeurIPS, workshop on Optimal Transport in Machine Learning, Dec 2021, Virtual-only Conference, France. ⟨hal-03426813⟩

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