English

Lipschitz Geometry of Mixed Polynomials

Metric Geometry 2025-12-02 v1 Geometric Topology

Abstract

We investigate the (ambient) bi-Lipschitz V-equivalence of two-variable mixed polynomials satisfying the Newton inner non-degeneracy condition. Concerning triviality, we show that ambient bi-Lipschitz V-triviality for families {f+εθ}εR\{f + \varepsilon \theta\}_{\varepsilon \in \mathbb{R}} is guaranteed when ff is semi-radially weighted homogeneous and the weighted radial degree of every monomial in θ\theta is greater than the weighted radial degree associated with ff. However, in the general case, we prove that it is not guaranteed, even though ambient topological V-triviality still holds. For the classification problem, we define two simple metric links and prove that they suffice to determine bi-Lipschitz V-equivalence within the class of mixed polynomials that are Γinn\Gamma_{\rm inn}-nice. A key outcome is that neither the Newton boundary Γ(f)\Gamma(f) nor the C-face diagram Γinn\Gamma_{\rm inn} constitutes an invariant of this equivalence for such mixed polynomials. To outcome this, we introduce new data extracted from the two face diagrams under consideration and prove that, under certain generic conditions, these data become fundamental invariants for the bi-Lipschitz equivalences. This provides a fundamental step toward a bi-Lipschitz classification of these mixed polynomials.

Keywords

Cite

@article{arxiv.2512.00258,
  title  = {Lipschitz Geometry of Mixed Polynomials},
  author = {Davi Lopes Medeiros and José Edson Sampaio and Eder Leandro Sanchez Quiceno},
  journal= {arXiv preprint arXiv:2512.00258},
  year   = {2025}
}

Comments

42 pages, 6 figures

R2 v1 2026-07-01T08:00:26.213Z