Automorphisms of Ck with an invariant non-recurrent attracting Fatou component biholomorphic to C× ( C)k-1
Abstract
We prove the existence of automorphisms of Ck, k 2, having an invariant, non-recurrent Fatou component biholomorphic to C × ( C)k-1 which is attracting, in the sense that all the orbits converge to a fixed point on the boundary of the component. Such a Fatou component also avoids k analytic discs intersecting transversally at the fixed point. As a corollary, we obtain a Runge copy of C × ( C)k-1 in Ck.
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