Punctured parabolic cylinders in automorphisms of C2

Abstract

We show the existence of automorphisms F of C2 with a non-recurrent Fatou component biholomorphic to C×C* that is the basin of attraction to an invariant entire curve on which F acts as an irrational rotation. We further show that the biholomorphism ×C* can be chosen such that it conjugates F to a translation (z,w)(z+1,w), making a parabolic cylinder as recently defined by L.~Boc Thaler, F.~Bracci and H.~Peters. F and are obtained by blowing up a fixed point of an automorphism of C2 with a Fatou component of the same biholomorphic type attracted to that fixed point, established by F.~Bracci, J.~Raissy and B.~Stensnes. A crucial step is the application of the density property of a suitable Lie algebra to show that the automorphism in their work can be chosen such that it fixes a coordinate axis. We can then remove the proper transform of that axis from the blow-up to obtain an F-stable subset of the blow-up that is biholomorphic to C2. Thus we can interpret F as an automorphism of C2.