Partial Isometries of a Sub-Riemannian Manifold

Abstract

In this paper, we obtain the following generalisation of isometric C1-immersion theorem of Nash and Kuiper. Let M be a smooth manifold of dimension m and H a rank k subbundle of the tangent bundle TM with a Riemannian metric gH. Then the pair (H,gH) defines a sub-Riemannian structure on M. We call a C1-map f:(M,H,gH) (N,h) into a Riemannian manifold (N,h) a partial isometry if the derivative map df restricted to H is isometric; in other words, f*h|H=gH. The main result states that if N>k then a smooth H-immersion f0:M N satisfying f*h|H<gH can be homotoped to a partial isometry f:(M,gH) (N,h) which is C0-close to f0. In particular we prove that every sub-Riemannian manifold (M,H,gH) admits a partial isometry in n provided n≥ m+k.