Dynamical degrees of affine-triangular automorphisms of affine spaces

Abstract

We study the possible dynamical degrees of automorphisms of the affine space An. In dimension n=3, we determine all dynamical degrees arising from the composition of an affine automorphism with a triangular one. This generalises the easier case of shift-like automorphisms which can be studied in any dimension. We also prove that each weak Perron number is the dynamical degree of an affine-triangular automorphism of the affine space An for some n, and we give the best possible n for quadratic integers, which is either 3 or 4.