Composition-Differentiation Operator On Hardy-Hilbert Space of Dirichlet Series

Abstract

In this paper, we establish a compactness criterion for the composition-differentiation operator \( D \) in terms of a decay condition of the mean counting function at the boundary of a half-plane. We provide a sufficient condition of the boundedness of the operator \( D \) for the symbol \( \) with zero characteristic. Additionally, we investigate an estimate for the norm of \( D \) in the Hardy-Hilbert space of Dirichlet series, specifically with the symbol \( (s) = c1 + c2 2-s \). We also derive an estimate for the approximation numbers of the operator \( D \). Moreover, we determine an explicit conditions under which the operator \( D \) is self-adjoint and normal. Finally, we describe the spectrum of \( D \) when the symbol \( (s) = c1 + c2 2-s \).

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