Automorphisms of the affine 3-space of degree 3

Abstract

In this article we give two explicit families of automorphisms of degree ≤ 3 of the affine 3-space A3 such that each automorphism of degree ≤ 3 of A3 is a member of one of these families up to composition of affine automorphisms at the source and target; this shows in particular that all of them are tame. As an application, we give the list of all dynamical degrees of automorphisms of degree ≤ 3 of A3; this is a set of 3 integers and 9 quadratic integers. Moreover, we also describe up to compositions with affine automorphisms for n≥ 1 all morphisms A3 An of degree ≤ 3 with the property that the preimage of every affine hyperplane in An is isomorphic to A2.