Degree growth of polynomial automorphisms and birational maps: some examples

Abstract

We provide the existence of new degree growths in the context of polynomial automorphisms of Ck: if k is an integer ≥ 3, then for any ≤ [k-12] there exist polynomial automorphisms f of Ck such that deg\, fn n. We also give counter-examples in dimension k≥ 3 to some classical properties satisfied by polynomial automorphisms of C2. We provide the existence of new degree growths in the context of birational maps of PkC: assume k≥ 3; forall 0≤≤ k there exist birational maps φ of PkC such that deg\, φn n.