On the non-hypercyclicity of scalar type spectral operators and collections of their exponentials

Abstract

Generalizing the case of a normal operator in a complex Hilbert space, we give a straightforward proof of the non-hypercyclicity of a (bounded or unbounded) scalar type spectral operator A in a complex Banach space as well as of the collection \etA\t 0 of the exponentials of such an operator, which, under a certain condition on the spectrum of the operator A, coincides with the C0-semigroup generated by A. The spectrum of A lying on the imaginary axis, we also show that non-hypercyclic is the strongly continuous group \etA\t∈ R of bounded linear operators generated by A. From the general results, we infer that, in the complex Hilbert space L2( R), the anti-self-adjoint differentiation operator A:=ddx with the domain D(A):=W21( R) is non-hypercyclic and so is the left-translation strongly continuous unitary operator group generated by A.