International audienceWe propose a technique for interpolating between probability distributions on discrete surfaces, based on the theory of optimal transport. Unlike previous attempts that use linear programming, our method is based on a dynamical formulation of quadratic optimal transport proposed for flat domains by Benamou and Brenier [2000], adapted to discrete surfaces. Our structure-preserving construction yields a Riemannian metric on the (finite-dimensional) space of probability distributions on a discrete surface, which translates the so-called Otto calculus to discrete language. From a practical perspective, our technique provides a smooth interpolation between distributions on discrete surfaces with less diffusion than state-of...
This chapter describes techniques for the numerical resolution of optimal transport problems. We wil...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Erbar M, Maas J, Wirth M. On the geometry of geodesics in discrete optimal transport. Calc. Var. Par...
We propose a technique for interpolating between probability distributions on discrete surfaces, bas...
International audienceIn this article, we introduce a new algorithm for solving discrete optimal tra...
Abstract. In this article, we introduce a new algorithm for solving discrete optimal transport based...
In this thesis we apply the optimal transport (OT) theory to various disciplines of applied and comp...
We introduce a novel method for computing the earth mover’s dis-tance (EMD) between probability dist...
International audienceOriginally defined for the optimal allocation of resources, optimal transport ...
This paper deals with dynamical optimal transport metrics defined by spatial discretisation of the B...
We study the computational complexity of the optimal transport problem that evaluates the Wasserstei...
The dynamical formulation of optimal transport, also known as Benamou–Brenier formulation or computa...
International audienceWe propose a fast and scalable algorithm to project a given density on a set o...
In semi-discrete optimal transport, a measure with a density is transported to a sum of Dirac masses...
International audienceThis paper defines a new transport metric over the space of non-negative measu...
This chapter describes techniques for the numerical resolution of optimal transport problems. We wil...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Erbar M, Maas J, Wirth M. On the geometry of geodesics in discrete optimal transport. Calc. Var. Par...
We propose a technique for interpolating between probability distributions on discrete surfaces, bas...
International audienceIn this article, we introduce a new algorithm for solving discrete optimal tra...
Abstract. In this article, we introduce a new algorithm for solving discrete optimal transport based...
In this thesis we apply the optimal transport (OT) theory to various disciplines of applied and comp...
We introduce a novel method for computing the earth mover’s dis-tance (EMD) between probability dist...
International audienceOriginally defined for the optimal allocation of resources, optimal transport ...
This paper deals with dynamical optimal transport metrics defined by spatial discretisation of the B...
We study the computational complexity of the optimal transport problem that evaluates the Wasserstei...
The dynamical formulation of optimal transport, also known as Benamou–Brenier formulation or computa...
International audienceWe propose a fast and scalable algorithm to project a given density on a set o...
In semi-discrete optimal transport, a measure with a density is transported to a sum of Dirac masses...
International audienceThis paper defines a new transport metric over the space of non-negative measu...
This chapter describes techniques for the numerical resolution of optimal transport problems. We wil...
Optimal Transport is a well developed mathematical theory that defines robust metrics between probab...
Erbar M, Maas J, Wirth M. On the geometry of geodesics in discrete optimal transport. Calc. Var. Par...