Add to ORKGThe classical minimum principle is foundational in convex and complex analysis and plays an important role in the study of the real and complex Monge-Ampere equations. This note establishes a minimum principle in Lagrangian geometry. This principle relates the classical Lagrangian angle of Harvey-Lawson and the space-time Lagrangian angle introduced recently by Rubinstein-Solomon. As an application, this gives a new formula for solutions of the degenerate special Lagrangian equation in space-time in terms of the (time) partial Legendre transform of a family of solutions of obstacle problems for the (space) non-degenerate special Lagrangian equation
summary:We study dynamics of singular Lagrangian systems described by implicit differential equation...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
Abstract. So far our approach to classical mechanics was limited to finding a critical point of a ce...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
We present a novel variational view at Lagrangian mechanics based on the minimization of weighted in...
The focus of this thesis is two equations that arise in special Lagrangian geometry: the degenerate ...
An n-dimensional submanifold M in ${\bf C}\sp{n} = {\bf R}\sp{2n}$ is called Lagrangian if the restr...
Suppose M1 and M2 are two special Lagrangian submanifolds of Rtn with boundary that intersect transv...
There is a dual program linked with every nonlinear program. The dual objective function is called t...
In this thesis we study how the information about the Hessian of optimal control problems can be enc...
AbstractIn this note we study the moduli space of minimal Legendrian submanifolds in the standard sp...
Abstract. Let Σ be a complete minimal Lagrangian submanifold of C n . We identify several regions in...
This article studies some examples of the family of problems where a Lagrangian is given for maps fr...
. Let L be a convex superlinear Lagrangian on a closed connected manifold M . We consider critical v...
A second order family of special Lagrangian submanifolds of complex m-space is a family characterize...
summary:We study dynamics of singular Lagrangian systems described by implicit differential equation...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
Abstract. So far our approach to classical mechanics was limited to finding a critical point of a ce...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
We present a novel variational view at Lagrangian mechanics based on the minimization of weighted in...
The focus of this thesis is two equations that arise in special Lagrangian geometry: the degenerate ...
An n-dimensional submanifold M in ${\bf C}\sp{n} = {\bf R}\sp{2n}$ is called Lagrangian if the restr...
Suppose M1 and M2 are two special Lagrangian submanifolds of Rtn with boundary that intersect transv...
There is a dual program linked with every nonlinear program. The dual objective function is called t...
In this thesis we study how the information about the Hessian of optimal control problems can be enc...
AbstractIn this note we study the moduli space of minimal Legendrian submanifolds in the standard sp...
Abstract. Let Σ be a complete minimal Lagrangian submanifold of C n . We identify several regions in...
This article studies some examples of the family of problems where a Lagrangian is given for maps fr...
. Let L be a convex superlinear Lagrangian on a closed connected manifold M . We consider critical v...
A second order family of special Lagrangian submanifolds of complex m-space is a family characterize...
summary:We study dynamics of singular Lagrangian systems described by implicit differential equation...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
Abstract. So far our approach to classical mechanics was limited to finding a critical point of a ce...