On smoothness, tangent cones, and the metric geometry of definable sets

Abstract

In this paper, we present several definitive characterizations of the C1 smoothness of definable sets in terms of their tangent cones and some other metric properties. In particular, we recover some of the beautiful characterizations presented by Ghomi and Howard (2014) and by Kurdyka, Le Gal, and Nhan (2018). For instance, we prove that for any X⊂ Rn that is a locally closed d-dimensional definable set in an o-minimal structure, the following items are equivalent: (1) X is Lipschitz normally embedded (LNE), C3(X,p) is a d-dimensional linear subspace for any p∈ X and depends continuously on p; (2) For each p∈ X, X is Lipschitz regular at p and C4(X,p) is a d-dimensional linear subspace; (3) X is a topological manifold and for each p∈ X, X is LNE at p and C4(X,p)=C3(X,p); (4) X is a topological manifold, and C5(X,p) is a d-dimensional subset for any p∈ X; (5) X is C1 smooth.