Fatou-Bieberbach Domains

Abstract

We show that for any m∈\∞\ there exist m disjoint FB domains whose union is dense in k. In fact we show that any point not in the union is a boundary point for all the domains. We construct FB domains that contains arbitrary countable collections of subvarieties of k, and we construct FB domains that intersect elements of countable collections of affine subspaces of k in connected proper subsets. Moreover, we show that any Runge FB domain is the attracting basin for a sequence of automorphisms of k, although not necessarily if you only allow iteration of one automorphism. We also show that an increasing sequence of Runge k's is a k.

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