Isometric immersions of Riemannian manifolds in k-codimensional Euclidean space

Abstract

We use a new method to give conditions for the existence of a local isometric immersion of a Riemannian n-manifold M in Rn+k, for a given n and k. These equate to the (local) existence of a k-tuple of scalar fields on the manifold, satisfying a certain non-linear equation involving the Riemannian curvature tensor of M. Setting k=1, we proceed to recover the fundamental theorem of hypersurfaces. In the case of manifolds of positive sectional curvature and n≥ 3, we reduce the solvability of the Gauss and Codazzi equations to the cancelation of a set of obstructions involving the logarithm of the Riemann curvature operator. The resulting theorem has a structural similarity to the Weyl-Schouten theorem, suggesting a parallelism between conformally flat n-manifolds and those that admit an isometric immersion in Rn+1.