Composition operators and embedding theorems for some function spaces of Dirichlet series

Abstract

We observe that local embedding problems for certain Hardy and Bergman spaces of Dirichlet series are equivalent to boundedness of a class of composition operators. Following this, we perform a careful study of such composition operators generated by polynomial symbols on a scale of Bergman--type Hilbert spaces Dα. We investigate the optimal β such that the composition operator C maps Dα boundedly into Dβ. We also prove a new embedding theorem for the non-Hilbertian Hardy space Hp into a Bergman space in the half-plane and use it to consider composition operators generated by polynomial symbols on Hp, finding the first non-trivial results of this type. The embedding also yields a new result for the functional associated to the multiplicative Hilbert matrix.