Disjoint hypercyclicity, Sidon sets and weakly mixing operators
Abstract
We prove that a finite set of natural numbers J satisfies that J\0\ is not Sidon if and only if for any operator T, the disjoint hypercyclicity of \Tj:j∈ J\ implies that T is weakly mixing. As an application we show the existence of a non weakly mixing operator T such that T T2… Tn is hypercyclic for every n.
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