Gradient Flows of Penalty Functions in the Space of Smooth Embeddings

Abstract

Motivated by manifold learning techniques, we give an explicit lower bound for how far a smoothly embedded compact submanifold in RN can move in a normal direction and remain an embedding. In addition, given a penalty function P : Emb(M,RN) → R on the space of embeddings, we give a condition which guarantees that the gradient ∇ P of the penalty function is normal to φ(M) at every point.