Nhan Nguyen – Tangent cones and $C^1$ regularity of definable sets

Carte non disponible

Date/heure
Date(s) - 30 juin 2016

Catégories Pas de Catégories


In this talk we will present some criteria of tangent cones so that a definable set is a $C^1$ manifold. Namely, let $X$ be a connected locally closed definable set in $R^n$, we show that the following statements are equivalent1) $X$ is a $C^1$ manifold2) Tangent cone and paratangent cone of $X$ coincide,3) The tangent cone $T_x X$ of $X$ at the point $x$ is k-dimensional linear subspace of $R^n$ (k does not depend on $x$) varies continuously in $x$, and the density $\theta(X, x) < 3/2$.[

Nhan Nguyen – Tangent cones and $C^1$ regularity of definable sets

Carte non disponible

Date/heure
Date(s) - 30 juin 2016

Catégories Pas de Catégories


In this talk we will present some criteria of tangent cones so that a definable set is a $C^1$ manifold. Namely, let $X$ be a connected locally closed definable set in $R^n$, we show that the following statements are equivalent1) $X$ is a $C^1$ manifold2) Tangent cone and paratangent cone of $X$ coincide,3) The tangent cone $T_x X$ of $X$ at the point $x$ is k-dimensional linear subspace of $R^n$ (k does not depend on $x$) varies continuously in $x$, and the density $\theta(X, x) < 3/2$.[