Local bi-Lipschitz classification of semialgebraic surfaces

Abstract

We provide bi-Lipschitz invariants for finitely determined map germs f: (Kn,0) (Kp, 0), where K = R or C. The aim of the paper is to provide partial answers to the following questions: Does the bi-Lipschitz type of a map germ f: (Rn, 0) (Rp, 0) determine the bi-Lipschitz type of the link of f and of the double point set of f? Reciprocally, given a map germ f: (Rn, 0) (Rp, 0), do the bi-Lipschitz types of the link of f and of the double point set of f determine the bi-Lipschitz type of the germ f: (Rn, 0) (Rp, 0)? We provide a positive answer to the first question in the case of a finitely determined map germ f: (Rn, 0) (Rp, 0) where 2n-1 ≤ p (Theorem 3.3). With regard to the second question, for a finitely determined map germ f : (R2,0) (R3,0), we show that a complete set of invariants for the bi-Lipschitz classification with respect to the inner metric of Xf=f(U), where U is a small neighbourhood of the origin in R2, is is given by the link of f, the image of the double point set of f and the polar curve of a generic projection into the plane (Proposition 4.13). In particular, in the homogeneous parametrization case f: (R2, 0) (R3, 0) of corank 1, we do not need the hypothesis on the equivalence of the image of the double point set (Theorem 5.2). Finally, we apply our results to relate the C0- A classes of finitely determined map germs f of corank 1 with homogeneous parametrization and the inner bi-Lipschitz type of Xf (Proposition 5.4).