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Non-wandering Fatou components for strongly attracting polynomial skew products

Published 16 Feb 2018 in math.DS and math.CV | (1802.05972v2)

Abstract: We show a partial generalization of Sullivan's non-wandering domain theorem in complex dimension two. More precisely, we show the non-existence of wandering Fatou components for polynomial skew products of $ \mathbb{C}2$ with an invariant attracting fiber, under the assumption that the multiplier $ \lambda $ is small. We actually show a stronger result, namely that every forward orbit of any vertical Fatou disk intersects a bulging Fatou component.

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