Livsic Theorem for Banach Rings
Abstract
We prove the Livsic Theorem for H\"older continuous cocycles with values in Banach rings. We consider a transitive homeomorphism σ:X X that satisfies the Anosov Closing Lemma, and a H\"older continuous map a:X B× from a compact metric space X to the set of invertible elements of some Banach ring B. We show that it is a coboundary with a H\"older continuous transition function if and only if a(σn-1p)… a(σ p)a(p)=e for each periodic point p=σn p.
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