Stereographic compactification and affine bi-Lipschitz homeomorphisms

Abstract

Let σq : Rq Sq Nq be the inverse of the stereographic projection with centre the north pole Nq. Let Wi be a closed subset of Rqi, for i=1,2. Let :W1 W2 be a bi-Lipschitz homeomorphism. The main result states that the homeomorphism σq2 σq1-1 is a bi-Lipschitz homeomorphism, extending bi-Lipschitz-ly at Nq1 with value Nq2 whenever W1 is unbounded. As two straightforward applications in the polynomially bounded o-minimal context over the real numbers, we obtain for free a version at infinity of: 1) Sampaio's tangent cone result; 2) Links preserving re-parametrization of definable bi-Lipschitz homeomorphisms of Valette.