Montel's theorem and composition operators for analytic almost periodic functions

Abstract

We consider the Banach space H∞ap(C0) of bounded analytic functions on the open right half-plane C0 that are almost periodic on some smaller half-plane, as well as the subspace Aap(C0) of those functions in H∞ap(C0) that are uniformly continuous on C0. We prove a strong version of Montel's theorem for H∞ap(C0) and characterize the bounded composition operators on H∞ap(C0) and Aap(C0), as well as the compact composition operators on H∞ap(C0) and certain subspaces of it.

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