Add to ORKGThis work is about the use of regularized optimal-transport distances for convex, histogram-based image segmentation. In the considered framework, fixed exemplar histograms define a prior on the statistical features of the two regions in competition. In this paper, we investigate the use of various transport-based cost functions as discrepancy measures and rely on a primal-dual algorithm to solve the obtained convex optimization problem
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
International audienceThis article introduces a generalization of discrete Optimal Transport that in...
International audienceThis work is about the use of regularized optimal-transport distances for conv...
International audienceThis work is about the use of regularized optimal-transport distances for conv...
We investigate in this work a versatile convex framework for multiple image segmentation, relying on...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Abstract. This article introduces a generalization of the discrete optimal transport, with ap-plicat...
This article introduces a generalization of the discrete optimal transport, with applications to col...
This article introduces a generalization of the discrete optimal transport, with applications to col...
This article introduces a generalization of discrete Optimal Transport that includes a regularity pe...
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
International audienceThis article introduces a generalization of discrete Optimal Transport that in...
International audienceThis work is about the use of regularized optimal-transport distances for conv...
International audienceThis work is about the use of regularized optimal-transport distances for conv...
We investigate in this work a versatile convex framework for multiple image segmentation, relying on...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
International audienceWe investigate in this work a versatile convex framework for multiple image se...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Abstract. This article introduces a generalization of the discrete optimal transport, with ap-plicat...
This article introduces a generalization of the discrete optimal transport, with applications to col...
This article introduces a generalization of the discrete optimal transport, with applications to col...
This article introduces a generalization of discrete Optimal Transport that includes a regularity pe...
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
National audienceIn this work, a convex and robust formulation of the unsupervised co-segmentation p...
International audienceThis article introduces a generalization of discrete Optimal Transport that in...