On the Whitney distortion extension problem for Cm( Rn) and C∞( Rn) and its applications to interpolation and alignment of data in Rn

Abstract

In this announcement we consider the following problem. Let n,m≥ 1, U⊂ Rn open. In this paper we provide a sharp solution to the following Whitney distortion extension problems: (a) Let φ:U Rn be a Cm map. If E⊂ U is compact (with some geometry) and the restriction of φ to E is an almost isometry with small distortion, how to decide when there exists a Cm( Rn) one-to-one and onto almost isometry : Rn Rn with small distortion which agrees with φ in a neighborhood of E and a Euclidean motion A: Rn Rn away from E. (b) Let φ:U Rn be C∞ map. If E⊂ U is compact (with some geometry) and the restriction of φ to E is an almost isometry with small distortion, how to decide when there exists a C∞( Rn) one-to-one and onto almost isometry : Rn Rn with small distortion which agrees with φ in a neighborhood of E and a Euclidean motion A: Rn Rn away from E. Our results complement those of [14,15,20] where there, E is a finite set. In this case, the problem above is also a problem of interpolation and alignment of data in Rn. The material in this paper appears in the memoir [14].