English

Tangential approximation of analytic sets

Algebraic Geometry 2020-05-13 v1

Abstract

Two subanalytic subsets of Rn \mathbb R^n are called ss-equivalent at a common point PP if the Hausdorff distance between their intersections with the sphere centered at PP of radius rr vanishes to order >s>s as rr tends to 00. In this work we strengthen this notion in the case of real subanalytic subsets of Rn\mathbb R^n with isolated singular points, introducing the notion of tangential ss-equivalence at a common singular point which considers also the distance between the tangent planes to the sets near the point. We prove that, if V(f)V(f) is the zero-set of an analytic map ff and if we assume that V(f)V(f) has an isolated singularity, say at the origin OO, then for any s1s\geq 1 the truncation of the Taylor series of ff of sufficiently high order defines an algebraic set with isolated singularity at OO which is tangentially ss-equivalent to V(f)V(f).

Keywords

Cite

@article{arxiv.1905.06441,
  title  = {Tangential approximation of analytic sets},
  author = {M. Ferrarotti and E. Fortuna and L. Wilson},
  journal= {arXiv preprint arXiv:1905.06441},
  year   = {2020}
}
R2 v1 2026-06-23T09:08:02.895Z