We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, we advance a functional defined on entire trajectories, whose minimizers converge to curves of maximal slope for geodesically convex energies. The crucial step of the argument is the reformulation of the variational approach in terms of a dynamic programming principle, and the use of the corresponding Hamilton–Jacobi equation. The result is applicable to a large class of nonlinear evolution PDEs including nonlinear drift-diffusion, Fokker–Planck, and heat flows on metric-measure spaces
Curves of maximal slope are a reference gradient-evolution notion in metric spaces and arise as vari...
This paper addresses the Cauchy problem for the gradient flow equation in a Hilbert space governed b...
AbstractMotivated from Arnold's variational characterization of the Euler equation in terms of geode...
We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, ...
Abstract. In this note we report on a new variational principle for Gradient Flows in metric spaces....
In this note we report on a new variational principle for Gradient Flows in metric spaces. This new ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
This paper develops the so-called Weighted Energy-Dissipation (WED) variational approach for the ana...
We study the main consequences of the existence of a Gradient Flow (GF for short), in the form of Ev...
We study the asymptotic behaviour of families of gradient flows in a general metric setting, when th...
We investigate a global-in-time variational approach to abstract evolution by means of the weighted ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
We first establish the explicit structure of nonlinear gradient flow systems on metric spaces and th...
We develop the long-time analysis for gradient flow equations in metric spaces. In particular, we co...
We present a framework enabling variational data assimilation for gradient flows in general metric s...
Curves of maximal slope are a reference gradient-evolution notion in metric spaces and arise as vari...
This paper addresses the Cauchy problem for the gradient flow equation in a Hilbert space governed b...
AbstractMotivated from Arnold's variational characterization of the Euler equation in terms of geode...
We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, ...
Abstract. In this note we report on a new variational principle for Gradient Flows in metric spaces....
In this note we report on a new variational principle for Gradient Flows in metric spaces. This new ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
This paper develops the so-called Weighted Energy-Dissipation (WED) variational approach for the ana...
We study the main consequences of the existence of a Gradient Flow (GF for short), in the form of Ev...
We study the asymptotic behaviour of families of gradient flows in a general metric setting, when th...
We investigate a global-in-time variational approach to abstract evolution by means of the weighted ...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
We first establish the explicit structure of nonlinear gradient flow systems on metric spaces and th...
We develop the long-time analysis for gradient flow equations in metric spaces. In particular, we co...
We present a framework enabling variational data assimilation for gradient flows in general metric s...
Curves of maximal slope are a reference gradient-evolution notion in metric spaces and arise as vari...
This paper addresses the Cauchy problem for the gradient flow equation in a Hilbert space governed b...
AbstractMotivated from Arnold's variational characterization of the Euler equation in terms of geode...