© 7th International Conference on Learning Representations, ICLR 2019. All Rights Reserved. Euclidean embeddings of data are fundamentally limited in their ability to capture latent semantic structures, which need not conform to Euclidean spatial assumptions. Here we consider an alternative, which embeds data as discrete probability distributions in a Wasserstein space, endowed with an optimal transport metric. Wasserstein spaces are much larger and more flexible than Euclidean spaces, in that they can successfully embed a wider variety of metric structures. We exploit this flexibility by learning an embedding that captures semantic information in the Wasserstein distance between embedded distributions. We examine empirically the representa...
Predictive states for stochastic processes are a nonparametric and interpretable construct with rele...
We seek a generalization of regression and principle component analysis (PCA) in a metric space wher...
International audienceMany variants of the Wasserstein distance have been introduced to reduce its o...
International audienceThe Wasserstein distance received a lot of attention recently in the community...
Optimal Transport (OT) metrics allow for defining discrepancies between two probability measures. Wa...
We present a framework for building unsupervised representations of entities and their compositions,...
International audienceOptimal Transport theory enables the definition of a distance across the set o...
Comparing probability distributions is at the crux of many machine learning algorithms. Maximum Mean...
This open access book presents the key aspects of statistics in Wasserstein spaces, i.e. statistics ...
AMS subject classifications. 33F05, 49M99, 65D99, 90C08International audienceThis article introduces...
We propose a novel approach for comparing distributions whose supports do not necessarily lie on the...
We present new algorithms to compute the mean of a set of empirical probability measures under the o...
International audienceOptimal Transport (OT) defines geometrically meaningful "Wasserstein" distance...
Predictive states for stochastic processes are a nonparametric and interpretable construct with rele...
We seek a generalization of regression and principle component analysis (PCA) in a metric space wher...
International audienceMany variants of the Wasserstein distance have been introduced to reduce its o...
International audienceThe Wasserstein distance received a lot of attention recently in the community...
Optimal Transport (OT) metrics allow for defining discrepancies between two probability measures. Wa...
We present a framework for building unsupervised representations of entities and their compositions,...
International audienceOptimal Transport theory enables the definition of a distance across the set o...
Comparing probability distributions is at the crux of many machine learning algorithms. Maximum Mean...
This open access book presents the key aspects of statistics in Wasserstein spaces, i.e. statistics ...
AMS subject classifications. 33F05, 49M99, 65D99, 90C08International audienceThis article introduces...
We propose a novel approach for comparing distributions whose supports do not necessarily lie on the...
We present new algorithms to compute the mean of a set of empirical probability measures under the o...
International audienceOptimal Transport (OT) defines geometrically meaningful "Wasserstein" distance...
Predictive states for stochastic processes are a nonparametric and interpretable construct with rele...
We seek a generalization of regression and principle component analysis (PCA) in a metric space wher...
International audienceMany variants of the Wasserstein distance have been introduced to reduce its o...