Add to ORKGIn this work, we study the Wasserstein gradient flow of the Riesz energy defined on the space of probability measures. The Riesz kernels define a quadratic functional on the space of measure which is not in general geodesically convex in the Wasserstein geometry, therefore one cannot conclude to global convergence of the Wasserstein gradient flow using standard arguments. Our main result is the exponential convergence of the flow to the minimizer on a closed Riemannian manifold under the condition that the logarithm of the source and target measures are Hölder continuous. To this goal, we first prove that the Polyak-Lojasiewicz inequality is satisfied for sufficiently regular solutions. The key regularity result is the global in-time existe...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e > 0, t...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite $\e>0$, ...
A recurring obstacle in the study of Wasserstein gradient flow is the lack of convexity of...
In this work, we study the Wasserstein gradient flow of the Riesz energy defined on the space of pro...
In this paper, we study the Wasserstein gradient flow structure of the porous medium equation restri...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
This thesis is based on three main topics: In the first part, we study convergence of discrete gradi...
The defining equation $(\ast):\ \dot \omega_t=-F'(\omega_t),$ of a gradient flow is kinetic in esse...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle system on on...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle sy...
Gradient flows of energy functionals on the space of probability measures with Wasserstein metric ha...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
Gradient flows in the Wasserstein space have become a powerful tool in the analysis of diffusion equ...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e > 0, t...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite $\e>0$, ...
A recurring obstacle in the study of Wasserstein gradient flow is the lack of convexity of...
In this work, we study the Wasserstein gradient flow of the Riesz energy defined on the space of pro...
In this paper, we study the Wasserstein gradient flow structure of the porous medium equation restri...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
This thesis is based on three main topics: In the first part, we study convergence of discrete gradi...
The defining equation $(\ast):\ \dot \omega_t=-F'(\omega_t),$ of a gradient flow is kinetic in esse...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle system on on...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
We study the Fokker–Planck equation as the many-particle limit of a stochastic particle sy...
Gradient flows of energy functionals on the space of probability measures with Wasserstein metric ha...
An algebraic decay rate is derived which bounds the time required for velocities to equilibrate in a...
Gradient flows in the Wasserstein space have become a powerful tool in the analysis of diffusion equ...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite e > 0, t...
We study a singular-limit problem arising in the modelling of chemical reactions. At finite $\e>0$, ...
A recurring obstacle in the study of Wasserstein gradient flow is the lack of convexity of...