Add to ORKGWe characterize arbitrary codimensional smooth manifolds M with boundary embedded in Rn using the square distance function and the signed distance function from M and from its boundary. The results are localized in an open set
An algorithm for computing intrinsic distance functions and geodesics on sub-manifolds of Rd given b...
AbstractTakeNsites distributed randomly and uniformly on a smooth closed surface. We express the exp...
Presenting some new arguments in the theory of critical points of distance functions, we generalize ...
We characterize arbitrary codimensional smooth manifolds M with boundary embedded in Rn using the sq...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
Given a Riemannian manifold M on a bounded domain endowed with the metric G, we construct a conforma...
summary:If $X$ is a convex surface in a Euclidean space, then the squared intrinsic distance functi...
In studying the geometry of a submanifold, it is often convenient to represent the submanifold as th...
In this talk we will consider sequences of compact oriented Riemannian manifolds with smooth bounda...
AbstractIt is shown by elementary means that a Ck hypersurface M of positive reach in Rn + 1 has the...
Thesis (Ph.D.), Mathematics, Washington State UniversityThe art of analysis involves the subtle comb...
Let (Mn, g) be a compact Riemannian manifold with boundary ∂M. Its boundary distance function is the...
© 2020, Allerton Press, Inc. For an open subset of the Euclidean space of dimension n we consider in...
An algorithm for computing intrinsic distance functions and geodesics on sub-manifolds of Rd given b...
AbstractTakeNsites distributed randomly and uniformly on a smooth closed surface. We express the exp...
Presenting some new arguments in the theory of critical points of distance functions, we generalize ...
We characterize arbitrary codimensional smooth manifolds M with boundary embedded in Rn using the sq...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
We prove a conjecture of De Giorgi on the regularity of the square distance function from manifolds ...
Given a Riemannian manifold M on a bounded domain endowed with the metric G, we construct a conforma...
summary:If $X$ is a convex surface in a Euclidean space, then the squared intrinsic distance functi...
In studying the geometry of a submanifold, it is often convenient to represent the submanifold as th...
In this talk we will consider sequences of compact oriented Riemannian manifolds with smooth bounda...
AbstractIt is shown by elementary means that a Ck hypersurface M of positive reach in Rn + 1 has the...
Thesis (Ph.D.), Mathematics, Washington State UniversityThe art of analysis involves the subtle comb...
Let (Mn, g) be a compact Riemannian manifold with boundary ∂M. Its boundary distance function is the...
© 2020, Allerton Press, Inc. For an open subset of the Euclidean space of dimension n we consider in...
An algorithm for computing intrinsic distance functions and geodesics on sub-manifolds of Rd given b...
AbstractTakeNsites distributed randomly and uniformly on a smooth closed surface. We express the exp...
Presenting some new arguments in the theory of critical points of distance functions, we generalize ...