Mixing convolution operators on spaces of entire functions
Abstract
We show that if E is an arbitrary (DFN)-space, then every nontrivial convolution operator on the Fr\'echet nuclear space H(E) is mixing, in particular hypercyclic. More generally we obtain the same conclusion when E=Fc, where F is a separable Fr\'echet space with the approximation property. On the opposite direction we show that a translation operator on the space H(CN) is never hypercyclic.
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