Bi-Lipschitz invariance of the multiplicity

TL;DR

This paper discusses the multiplicity of algebraic curve singularities as a geometric invariant and explores recent results demonstrating its invariance under bi-Lipschitz transformations, connecting classical concepts with modern geometric analysis.

Contribution

It presents recent joint results showing that the multiplicity of singular points is invariant under bi-Lipschitz maps, extending classical understanding.

Findings

Multiplicity is a measure of singularity severity.

Bi-Lipschitz invariance of multiplicity is established.

Connections to the Multiplicity Conjecture are discussed.

Abstract

The multiplicity of an algebraic curve $C$ in the complex plane at a point $p$ on that curve is defined as the number of points that occur at the intersection of $C$ with a general complex line that passes close to the point $p$. It is shown that $p$ is a singular point of the curve $C$ if and only if this multiplicity is greater than or equal to 2, in this sense, such an integer number can be considered as a measure of how singular can be a point of the curve $C$. In these notes, we address the classical concept of multiplicity of singular points of complex algebraic sets (not necessarily complex curves) and we approach the nature of the multiplicity of singular points as a geometric invariant from the perspective of the Multiplicity Conjecture (Zariski 1971). More precisely, we bring a discussion on the recent results obtained jointly with Lev Birbrair, Javier Fern\'andez de Bobadilla, L\^e Dung Trang and Mikhail Verbitsky on the bi-Lipschitz invariance of the multiplicity.