Linear Factorization of Hypercyclic Functions for Differential Operators
Abstract
On the Fr\'echet space of entire functions H(C), we show that every nonscalar continuous linear operator L:H(C) H(C) which commutes with differentiation has a hypercyclic vector f(z) in the form of the infinite product of linear polynomials: \[ f(z) = Πj=1∞ \, ( 1-zaj), \] where each aj is a nonzero complex number.
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