Bivariables and V\'en\'ereau polynomials

Abstract

We study a family of polynomials introduced by Daigle and Freudenburg, which contains the famous V\'en\'ereau polynomials and defines A2-fibrations over A2. According to the Dolgachev-Weisfeiler conjecture, every such fibration should have the structure of a locally trivial A2-bundle over A2. We follow an idea of Kaliman and Zaidenberg to show that these fibrations are locally trivial A2-bundles over the punctured plane, all of the same specific form Xf, depending on an element f∈ k[a 1,b 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 Xf 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 Xf. We hope that the terminology and methods developed here may lead to future study of the whole family Xf.