English

Bivariables and V\'en\'ereau polynomials

Algebraic Geometry 2020-04-23 v1

Abstract

We study a family of polynomials introduced by Daigle and Freudenburg, which contains the famous V\'en\'ereau polynomials and defines A2\mathbb{A}^2-fibrations over A2\mathbb{A}^2. According to the Dolgachev-Weisfeiler conjecture, every such fibration should have the structure of a locally trivial A2\mathbb{A}^2-bundle over A2\mathbb{A}^2. We follow an idea of Kaliman and Zaidenberg to show that these fibrations are locally trivial A2\mathbb{A}^2-bundles over the punctured plane, all of the same specific form XfX_f, depending on an element fk[a±1,b±1][x]f\in k[a^{\pm 1},b^{\pm 1}][x]. We then introduce the notion of bivariables and show that the set of bivariables is in bijection with the set of locally trivial bundles XfX_f that are trivial. This allows us to give another proof of Lewis's result stating that the second V\'en\'ereau polynomial is a variable and also to trivialise other elements of the family XfX_f. We hope that the terminology and methods developed here may lead to future study of the whole family XfX_f.

Keywords

Cite

@article{arxiv.2004.10739,
  title  = {Bivariables and V\'en\'ereau polynomials},
  author = {Jérémy Blanc and Pierre-Marie Poloni},
  journal= {arXiv preprint arXiv:2004.10739},
  year   = {2020}
}

Comments

25 pages, coments are welcome

R2 v1 2026-06-23T15:02:03.325Z