Add to ORKGThis book is devoted to a theory of gradient flows in spaces which are not necessarily endowed with a natural linear or differentiable structure. It consists of two parts, the first one concerning gradient flows in metric spaces and the second one devoted to gradient flows in the space of probability measures on a separable Hilbert space, endowed with the Kantorovich-Rubinstein-Wasserstein distance. The two parts have some connections, due to the fact that the space of probability measures provides an important model to which the "metric" theory applies, but the book is conceived in such a way that the two parts can be read independently, the first one by the reader more interested in non-smooth analysis and analysis in metric spaces, an...
The purpose of this thesis is to present in detail two theories, not deductible from each other, but...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...
This book is devoted to a theory of gradient flows in spaces which are not necessarily endowed with ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
In this treatise we present some important results of the theory of the Wasserstein space of proba...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
After a brief introduction on gradient flows in metric spaces and on geodesically convex functionals...
We present a short overview on the strongest variational formulation for gradi- ent flows of geodesi...
We present a short overview on the strongest variational formulation for gradi- ent flows of geodesi...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
The purpose of this thesis is to present in detail two theories, not deductible from each other, but...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...
This book is devoted to a theory of gradient flows in spaces which are not necessarily endowed with ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
Originating from lectures by L. Ambrosio at the ETH Zürich in Fall 2001, substantially extended and ...
In this treatise we present some important results of the theory of the Wasserstein space of proba...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
After a brief introduction on gradient flows in metric spaces and on geodesically convex functionals...
We present a short overview on the strongest variational formulation for gradi- ent flows of geodesi...
We present a short overview on the strongest variational formulation for gradi- ent flows of geodesi...
Many evolutionary partial differential equations may be rewritten as the gradient flow of an energy ...
The purpose of this thesis is to present in detail two theories, not deductible from each other, but...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...
We present some new results concerning well-posedness of gradient flows generated by λ-convex functio...