A Bohl-Bohr-Kadets type theorem characterizing Banach spaces not containing c0
Abstract
We prove that a separable Banach space E does not contain a copy of the space of null-sequences if and only if for every doubly power-bounded operator T on E and for every vector x∈ E the relative compactness of the sets \Tn+mx-Tnx: n∈ \ (for some/all m∈, m≥ 1) and \Tnx:n∈ \ are equivalent. With the help of the Jacobs--de Leeuw--Glicksberg decomposition of strongly compact semigroups the case of (not necessarily invertible) power-bounded operators is also handled.
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