On the set of hypercyclic vectors for the differentiation operator

Abstract

Let D be the differentiation operator Df=f' acting on the Fr\'echet space of all entire functions in one variable with the standard (compact-open) topology. It is known since 1950's that the set H(D) of hypercyclic vectors for the operator D is non-empty. We treat two questions raised by Aron, Conejero, Peris and Seoane-Sep\'ulveda whether the set H(D) contains (up to the zero function) a non-trivial subalgebra of or an infinite dimensional closed linear subspace of . In the present article both questions are answered affirmatively.