Semialgebraic Lipschitz equivalence polynomial functions
Abstract
We investigate the classification of quasihomogeneous polynomials in two variables with real coefficients under semialgebraic bi-Lipschitz equivalence in a neighborhood of the origin in . Building on the work of Birbrair, Fernandes, and Panazzolo, our approach is based on reducing the problem to the Lipschitz classification of associated single-variable polynomial functions, called height functions. We establish conditions under which semialgebraic bi-Lipschitz equivalence of quasihomogeneous polynomials corresponds to the Lipschitz equivalence of their height functions. To achieve this, we develop the theory of -transforms and inverse -transforms. As an application, we examine a family of quasihomogeneous polynomials previously used by Henry and Parusi\'nski to show that the bi-Lipschitz equivalence of analytic function germs admits continuous moduli. Our results show that semialgebraic bi-Lipschitz equivalence of real quasihomogeneous polynomials in two variables also admits continuous moduli.
Cite
@article{arxiv.2503.06022,
title = {Semialgebraic Lipschitz equivalence polynomial functions},
author = {Sergio Alvarez},
journal= {arXiv preprint arXiv:2503.06022},
year = {2025}
}
Comments
This paper supersedes arXiv:2006.11420, which was published under the title "From H\"older Triangles to the Whole Plane". The current version includes significant updates and a new title