A parabolic cylinder is an invariant, non-recurrent Fatou component Ω of an automorphism F of ℂ2 satisfying: (1) The closure of the -limit set of F on Ω contains an isolated fixed point, (2) there exists a univalent map Φ from Ω into ℂ2 conjugating F to the translation (,)↦(+1,), and (3) every limit map of {∘} on Ω has one-dimensional image. In this paper, we prove the existence of parabolic cylinders for an explicit class of maps, and show that examples in this class can be constructed as compositions of shears and overshears.
Automorphisms of C2 with parabolic cylinders / Boc Thaler, Luka; Bracci, Filippo; Peters, Han. - In: THE JOURNAL OF GEOMETRIC ANALYSIS. - ISSN 1050-6926. - ELETTRONICO. - 31:(2021), pp. 3498-3522. [10.1007/s12220-020-00403-4]
Automorphisms of C2 with parabolic cylinders
Bracci, Filippo;
2021
Abstract
A parabolic cylinder is an invariant, non-recurrent Fatou component Ω of an automorphism F of ℂ2 satisfying: (1) The closure of the -limit set of F on Ω contains an isolated fixed point, (2) there exists a univalent map Φ from Ω into ℂ2 conjugating F to the translation (,)↦(+1,), and (3) every limit map of {∘} on Ω has one-dimensional image. In this paper, we prove the existence of parabolic cylinders for an explicit class of maps, and show that examples in this class can be constructed as compositions of shears and overshears.
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