Add to ORKGNumerous infinite dimensional dynamical systems arising in different fields have been shown to exhibit a gradient flow structure in the Wasserstein space. We construct Two Point Flux Approximation Finite Volume schemes discretizing such problems which preserve the variational structure and have second order accuracy in space. We propose an interior point method to solve the discrete variational problem, providing an efficient and robust algorithm. We present two applications to test the scheme and show its order of convergence
The dynamical formulation of optimal transport, also known as Benamou-Brenier formulation or Computa...
A wide range of diffusion equations can be interpreted as gradient flow with respect to Wasserstein ...
Gradient flows in the Wasserstein space have become a powerful tool in the analysis of diffusion equ...
International audienceWe propose a variational finite volume scheme to approximate the solutions to ...
This thesis is devoted to the design of locally conservative and structure preserving schemes for Wa...
Numerous infinite dimensional dynamical systems arising in different fields have been shown to exhib...
International audienceWe study the JKO scheme for the total variation, characterize the optimizers, ...
AbstractMonge–Kantorovich mass transfer theory is employed to obtain an existence and uniqueness res...
We study the approximation of Wasserstein gradient structures by their finite-dimensional analog. We...
International audienceThe Wasserstein gradient flow structure of the PDE system governing multiphase...
peer reviewedThe Wasserstein gradient flow structure of the partial differential equation system gov...
As a counterpoint to classical stochastic particle methods for diffusion, we developa deterministic ...
International audienceThis article details a novel numerical scheme to approximate gradient flows fo...
This thesis is based on three main topics: In the first part, we study convergence of discrete gradi...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
The dynamical formulation of optimal transport, also known as Benamou-Brenier formulation or Computa...
A wide range of diffusion equations can be interpreted as gradient flow with respect to Wasserstein ...
Gradient flows in the Wasserstein space have become a powerful tool in the analysis of diffusion equ...
International audienceWe propose a variational finite volume scheme to approximate the solutions to ...
This thesis is devoted to the design of locally conservative and structure preserving schemes for Wa...
Numerous infinite dimensional dynamical systems arising in different fields have been shown to exhib...
International audienceWe study the JKO scheme for the total variation, characterize the optimizers, ...
AbstractMonge–Kantorovich mass transfer theory is employed to obtain an existence and uniqueness res...
We study the approximation of Wasserstein gradient structures by their finite-dimensional analog. We...
International audienceThe Wasserstein gradient flow structure of the PDE system governing multiphase...
peer reviewedThe Wasserstein gradient flow structure of the partial differential equation system gov...
As a counterpoint to classical stochastic particle methods for diffusion, we developa deterministic ...
International audienceThis article details a novel numerical scheme to approximate gradient flows fo...
This thesis is based on three main topics: In the first part, we study convergence of discrete gradi...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
The dynamical formulation of optimal transport, also known as Benamou-Brenier formulation or Computa...
A wide range of diffusion equations can be interpreted as gradient flow with respect to Wasserstein ...
Gradient flows in the Wasserstein space have become a powerful tool in the analysis of diffusion equ...