AbstractIn this paper we consider the problem of finding the relation between absolutely minimizing Lipschitz extension of a given function defined over a subset of the hyperbolic space and the viscosity solution of the PDE that appears from the associated variational problem. Here we have shown that the absolute minimizers can be fully characterized by a comparison principle (comparison with cones) with the fundamental solutions of the associated PDE. We have finally proved that the three properties, (i) comparison with cones, (ii) absolutely minimizing Lipschitz extension and (iii) viscosity solution of associated PDE, are equivalent
This paper develops a theory of Lipschitz comparisons of hyperbolic surfaces analogous to t...
The classical Lipschitz extension problem in concerned for conditions on a pair of metric spaces (X,...
AbstractThe Tonelli existence theorem in the calculus of variations and its subsequent modifications...
In this paper we consider the problem of finding the relation between absolutely minimizing Lipschit...
In this paper we consider the problem of finding the relation between absolutely minimizing Lipschit...
AbstractIn this paper we consider the problem of finding the relation between absolutely minimizing ...
We extend the principle of comparison with cones introduced by Crandall, Evans and Gariepy in [12] f...
2004-02International audienceWe prove the existence of Absolutely Minimizing Lipschitz Extensions by...
The objective of this dissertation is to give an exposition of the theory of absolutely minimizing L...
We define viscosity solutions of the Aronsson equation arising from Hamilton-Jacobi eikonal equation...
We derive a lower spatially Lipschitz bound for viscosity solutions to fully nonlinear parabolic par...
We establish interior Lipschitz regularity for continuous viscosity solutions of fully nonlinear, co...
We give some conditions that ensure the validity of a Comparison Principle for the Minimizers of int...
Abstract. Consider a bounded open set U ⊂ Rn and a Lipschitz function g: ∂U → Rm. Does this function...
We study a nonlinear partial differential equation with Lipschitz continuous coefficient functions. ...
This paper develops a theory of Lipschitz comparisons of hyperbolic surfaces analogous to t...
The classical Lipschitz extension problem in concerned for conditions on a pair of metric spaces (X,...
AbstractThe Tonelli existence theorem in the calculus of variations and its subsequent modifications...
In this paper we consider the problem of finding the relation between absolutely minimizing Lipschit...
In this paper we consider the problem of finding the relation between absolutely minimizing Lipschit...
AbstractIn this paper we consider the problem of finding the relation between absolutely minimizing ...
We extend the principle of comparison with cones introduced by Crandall, Evans and Gariepy in [12] f...
2004-02International audienceWe prove the existence of Absolutely Minimizing Lipschitz Extensions by...
The objective of this dissertation is to give an exposition of the theory of absolutely minimizing L...
We define viscosity solutions of the Aronsson equation arising from Hamilton-Jacobi eikonal equation...
We derive a lower spatially Lipschitz bound for viscosity solutions to fully nonlinear parabolic par...
We establish interior Lipschitz regularity for continuous viscosity solutions of fully nonlinear, co...
We give some conditions that ensure the validity of a Comparison Principle for the Minimizers of int...
Abstract. Consider a bounded open set U ⊂ Rn and a Lipschitz function g: ∂U → Rm. Does this function...
We study a nonlinear partial differential equation with Lipschitz continuous coefficient functions. ...
This paper develops a theory of Lipschitz comparisons of hyperbolic surfaces analogous to t...
The classical Lipschitz extension problem in concerned for conditions on a pair of metric spaces (X,...
AbstractThe Tonelli existence theorem in the calculus of variations and its subsequent modifications...