English

Algebraic Stability for Skew Products

Dynamical Systems 2024-08-06 v1 Algebraic Geometry

Abstract

In this article we study algebraic stability for rational skew products in two dimensions ϕ:XX\phi : X \dashrightarrow X, i.e. maps of the form ϕ(x,y)=(ϕ1(x),ϕ2(x,y))\phi(x, y) = (\phi_1(x), \phi_2(x, y)). We prove that when XX is a birationally ruled surface and ϕ1\phi_1 has no superattracting cycles, then we can always find a smooth surface X^\hat X and an algebraic stabilisation π:(ϕ^,X^)(ϕ,X)\pi : (\hat \phi, \hat X) \to (\phi, X) which is a birational morphism. We provide an example of a skew product ϕ\phi where ϕ1\phi_1 has a superattracting fixed point and ϕ\phi is not algebraically stable on any model. Our techniques involve transforming the stabilisation issue into a combinatorial dynamical problem for a 'non-Archimedean skew product' ϕ:Pan1(K)Pan1(K)\phi_*: \mathbb P^1_{\text{an}}(\mathbb K) \to \mathbb P^1_{\text{an}}(\mathbb K) on the Berkovich projective line over the Puiseux series, K\mathbb K. The Fatou-Julia theory for ϕ\phi_* is instrumental to our approach.

Keywords

Cite

@article{arxiv.2408.02658,
  title  = {Algebraic Stability for Skew Products},
  author = {Richard A. P. Birkett},
  journal= {arXiv preprint arXiv:2408.02658},
  year   = {2024}
}

Comments

35 pages, 7 figures

R2 v1 2026-06-28T18:04:32.560Z