Add to ORKGLet X and X' be two Banach spaces and let G C B be open. John [1] defines a quasi-isometric mapping f: G → X´ to be an open (i.e., maps open sets onto open sets) local homeomorphism for which
Two Banach spaces X and Y are said to be almost isometric if for every ?? > 1 there exists a ??-isom...
AbstractFor each infinite cardinal t property of being the union of countably many sets each locally...
summary:In this note, we prove that any “bounded” isometries of separable metric spaces can be repre...
AbstractLet f be a bi-Lipschitz mapping of the Euclidean ball BRn into ℓ2 with both Lipschitz consta...
This paper contains an exposition of two theorems on Banach spaces. Let X and Y be real Banach space...
AbstractSome relations between isometry and linearity are examined. In particular, generalizations o...
The paper is devoted to the investigation of topological properties of space mappings. It is shown t...
The paper is devoted to the investigation of topological properties of space mappings. It is shown t...
AbstractA famous theorem due to Nash assures that every Riemannian manifold can be embedded isometri...
Any quasi-isometry of the curve complex is bounded distance from a simplicial automorphism. As a con...
A famous theorem due to Nash ([3]) assures that every Riemannian manifold can be embedded isometrica...
AbstractThe purpose of this article is to characterize the quasi-isometry type of a proper metric sp...
AbstractThis paper is a survey of a number of recent results concerning conditions under which certa...
A famous theorem due to Nash ([3]) assures that every Riemannian manifold can be embedded isometrica...
AbstractWe construct two non-isometric closed subsets of the real line which are almost isometric, a...
Two Banach spaces X and Y are said to be almost isometric if for every ?? > 1 there exists a ??-isom...
AbstractFor each infinite cardinal t property of being the union of countably many sets each locally...
summary:In this note, we prove that any “bounded” isometries of separable metric spaces can be repre...
AbstractLet f be a bi-Lipschitz mapping of the Euclidean ball BRn into ℓ2 with both Lipschitz consta...
This paper contains an exposition of two theorems on Banach spaces. Let X and Y be real Banach space...
AbstractSome relations between isometry and linearity are examined. In particular, generalizations o...
The paper is devoted to the investigation of topological properties of space mappings. It is shown t...
The paper is devoted to the investigation of topological properties of space mappings. It is shown t...
AbstractA famous theorem due to Nash assures that every Riemannian manifold can be embedded isometri...
Any quasi-isometry of the curve complex is bounded distance from a simplicial automorphism. As a con...
A famous theorem due to Nash ([3]) assures that every Riemannian manifold can be embedded isometrica...
AbstractThe purpose of this article is to characterize the quasi-isometry type of a proper metric sp...
AbstractThis paper is a survey of a number of recent results concerning conditions under which certa...
A famous theorem due to Nash ([3]) assures that every Riemannian manifold can be embedded isometrica...
AbstractWe construct two non-isometric closed subsets of the real line which are almost isometric, a...
Two Banach spaces X and Y are said to be almost isometric if for every ?? > 1 there exists a ??-isom...
AbstractFor each infinite cardinal t property of being the union of countably many sets each locally...
summary:In this note, we prove that any “bounded” isometries of separable metric spaces can be repre...