Properties of Isometric Mappings

## Abstract A reliable method for maximum norm optimization of spatial mappings is suggested. It is applied to the problem of optimal flattening of surfaces and to precisely controlled surface morphing. Robustness and grid independence of the method are demonstrated on real‐life tests. Copyright ©

## Abstract We establish necessary and sufficient conditions involving trace mappings and Hahn–Banach extension operators for a Banach space to have metric or metric compact approximation properties. We also study metric approximation properties for dual spaces. As an application, alternative (hope

Sensitive dependence on initial conditions is widely understood as being the central idea of chaos. We first give sufficient conditions (both topological and ergodic) on an endomorphism to ensure the sensitivity property. Then, a strong sensitivity concept is introduced. Sufficient conditions on a t

there exists an element a of A -{x} such that the interval (set of vertices of all shortest paths) between x and a is disjoint from S. A set A ⊆ V (G) is geodesically closed if it contains all vertices which geodesically dominate A. These geodesically closed sets define a topology, called the geodes