Minimal Distortion Bending and Morphing of Compact Manifolds

Abstract

Let M and N be compact smooth oriented Riemannian n-manifolds without boundary embedded in Rn+1. Several problems about minimal distortion bending and morphing of M to N are posed. Cost functionals that measure distortion due to stretching or bending produced by a diffeomorphism h:M N are defined, and new results on the existence of minima of these cost functionals are presented. In addition, the definition of a morph between two manifolds M and N is given, and the theory of minimal distortion morphing of compact manifolds is reviewed.