Sobolev homeomorphisms and Poincare inequality

Abstract

We study global regularity properties of Sobolev homeomorphisms on n-dimensional Riemannian manifolds under the assumption of p-integrability of its first weak derivatives in degree p≥ n-1. We prove that inverse homeomorphisms have integrable first weak derivatives. For the case p>n we obtain necessary conditions for existence of Sobolev homeomorphisms between manifolds. These necessary conditions based on Poincar\'e type inequality: ∈fc∈ R \|u-c L∞(M)\|≤ K \|u L1∞(M)\|. As a corollary we obtain the following geometrical necessary condition: If there exists a Sobolev homeomorphisms φ: M M', φ∈ W1p(M, M'), p>n, J(x,φ) 0 a. e. in M, of compact smooth Riemannian manifold M onto Riemannian manifold M' then the manifold M' has finite geodesic diameter.