Composition Operators on Bohr-Bergman Spaces of Dirichlet Series

Abstract

For α ∈ R, let Dα denote the scale of Hilbert spaces consisting of Dirichlet series f(s) = Σn=1∞ an n-s that satisfy Σn=1∞ |an|2/[d(n)]α < ∞. The Gordon--Hedenmalm Theorem on composition operators for H2=D0 is extended to the Bergman case α>0. These composition operators are generated by functions of the form (s) = c0 s + (s), where c0 is a nonnegative integer and (s) is a Dirichlet series with certain convergence and mapping properties. For the operators with c0=0 a new phenomenon is discovered: If 0 < α < 1, the space Dα is mapped by the composition operator into a smaller space in the same scale. When α > 1, the space Dα is mapped into a larger space in the same scale. Moreover, a partial description of the composition operators on the Dirichlet--Bergman spaces Ap for 1 ≤ p < ∞ are obtained, in addition to new partial results for composition operators on the Dirichlet--Hardy spaces Hp when p is an odd integer.