We study evolution curves of variational type, called minimizing movements, obtained via a time discretization and minimization method. We analyze examples in Euclidean spaces, where some classes of minimizing movements are solutions of suitable ordinary differential equations of gradient flow type. Finally, we construct an example to show that in general these evolution curves are not maximal slope curves
We show that the classical solution of the heat equation can be seen as the minimizer of a suitable ...
We prove the existence of a weak global in time mean curvature flow of a bounded partition of spa...
We prove that a general condition introduced by Colombo and Gobbino to study limits of curves of max...
Curves of maximal slope are a reference gradient-evolution notion in metric spaces and arise as vari...
The Minimizing Movement (MM) scheme is a variational method introduced by E. De Giorgi to solve grad...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
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 ...
We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, ...
We present new abstract results on the interrelation between the minimizing movement scheme for grad...
This paper introduces a novel steepest descent flow in Banach spaces. This extends previous works on...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
This paper introduces a novel steepest descent flow in Banach spaces. This extends previous works on...
We show that the classical solution of the heat equation can be seen as the minimizer of a suitable ...
We show that the classical solution of the heat equation can be seen as the minimizer of a suitable ...
We prove the existence of a weak global in time mean curvature flow of a bounded partition of spa...
We prove that a general condition introduced by Colombo and Gobbino to study limits of curves of max...
Curves of maximal slope are a reference gradient-evolution notion in metric spaces and arise as vari...
The Minimizing Movement (MM) scheme is a variational method introduced by E. De Giorgi to solve grad...
This is the first of a series of papers devoted to a thorough analysis of the class of gradient flow...
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 ...
We present a novel variational approach to gradient-flow evolution in metric spaces. In particular, ...
We present new abstract results on the interrelation between the minimizing movement scheme for grad...
This paper introduces a novel steepest descent flow in Banach spaces. This extends previous works on...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
This paper introduces a novel steepest descent flow in Banach spaces. This extends previous works on...
We show that the classical solution of the heat equation can be seen as the minimizer of a suitable ...
We show that the classical solution of the heat equation can be seen as the minimizer of a suitable ...
We prove the existence of a weak global in time mean curvature flow of a bounded partition of spa...
We prove that a general condition introduced by Colombo and Gobbino to study limits of curves of max...