Disjoint strong transitivity of composition operators
Abstract
A Furstenberg family F is a collection of infinite subsets of the set of positive integers such that if A⊂ B and A∈ F, then B∈ F. For a Furstenberg family F, finitely many operators T1,...,TN acting on a common topological vector space X are said to be disjoint F-transitive if for every non-empty open subsets U0,...,UN of X the set \n∈ N:\ U0 T1-n(U1)... TN-n(UN)≠\ belongs to F. In this paper, depending on the topological properties of , we characterize the disjoint F-transitivity of N≥2 composition operators Cφ1,…,CφN acting on the space H() of holomorphic maps on a domain ⊂ C by establishing a necessary and sufficient condition in terms of their symbols φ1,...,φN.
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