Genuine deformations of Euclidean hypersurfaces in higher codimensions I

Abstract

Sbrana and Cartan gave local classifications for the set of Euclidean hypersurfaces Mn⊂eqRn+1 which admit another genuine isometric immersions in Rn+1 for n≥ 3. The main goal of this paper is to extend their classification to higher codimensions. Our main result is a complete description of the moduli space of genuine deformations of generic hypersurfaces of rank (p+1) in Rn+p for p≤ n-2. As a consequence, we obtain an analogous classification to the ones given by Sbrana and Cartan providing all local isometric immersions in Rn+2 of a generic hypersurface Mn⊂eqRn+1 for n≥ 4. We also show how the techniques developed here can be used to study conformally flat Euclidean submanifolds.