Let X be a separable, complete metric space and Pp(X) be the space of Borel probability measures with finite moment of order p > 1, metrized by the Wasserstein distance. In this paper we prove that every absolutely continuous curve with finite p-energy in the space Pp(X) can be represented by a Borel probability measure on C([0,T];X) concentrated on the set of absolutely continuous curves with finite p-energy in X. Moreover this measure satisfies a suitable property of minimality which entails an important relation on the energy of the curves. We apply this result to the geodesics of Pp(X) and to the continuity equation in Banach spaces
We prove that in metric measure spaces where the entropy functional is Kconvex along every Wasserst...
Let M denote the space of probability measures on R^D endowed with the Wasserstein metric. A differe...
We prove a general criterion for the density in energy of suitable subalgebras of Lipschitz function...
Let X be a separable, complete metric space and Pp(X) be the space of Borel probability measures wit...
In this paper we extend a previous result of the author [Lis07] of characterization of absolutely co...
In this paper we extend a previous result of the author [S. Lisini, Calc. Var. Partial D...
We propose a definition of the Dirichlet energy (which is roughly speaking the integral of the squar...
Borel probability measures living on metric spaces are fundamental mathematical objects. There are s...
We establish a general superposition principle for curves of measures solving a continuity equation ...
We consider the problem of approximating a probability measure defined on a metric space b...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
In recent works L.C. Evans has noticed a strong analogy between Mather’s theory of minimal measures ...
We develop the theory of a metric, which we call the $\nu$-based Wasserstein metric and denote by $W...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
We generalize an equation introduced by Benamou and Brenier in [BB00] and characterizing Wasserstein...
We prove that in metric measure spaces where the entropy functional is Kconvex along every Wasserst...
Let M denote the space of probability measures on R^D endowed with the Wasserstein metric. A differe...
We prove a general criterion for the density in energy of suitable subalgebras of Lipschitz function...
Let X be a separable, complete metric space and Pp(X) be the space of Borel probability measures wit...
In this paper we extend a previous result of the author [Lis07] of characterization of absolutely co...
In this paper we extend a previous result of the author [S. Lisini, Calc. Var. Partial D...
We propose a definition of the Dirichlet energy (which is roughly speaking the integral of the squar...
Borel probability measures living on metric spaces are fundamental mathematical objects. There are s...
We establish a general superposition principle for curves of measures solving a continuity equation ...
We consider the problem of approximating a probability measure defined on a metric space b...
In this paper we summarize some of the main results of a orthcoming book on this topic, where we exa...
In recent works L.C. Evans has noticed a strong analogy between Mather’s theory of minimal measures ...
We develop the theory of a metric, which we call the $\nu$-based Wasserstein metric and denote by $W...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
We generalize an equation introduced by Benamou and Brenier in [BB00] and characterizing Wasserstein...
We prove that in metric measure spaces where the entropy functional is Kconvex along every Wasserst...
Let M denote the space of probability measures on R^D endowed with the Wasserstein metric. A differe...
We prove a general criterion for the density in energy of suitable subalgebras of Lipschitz function...