Orthogonal decomposition of composition operators on the H2 space of Dirichlet series

Abstract

Let H2 denote the Hilbert space of Dirichlet series with square-summable coefficients. We study composition operators C on H2 which are generated by symbols of the form (s) = c0s + Σn≥1 cn n-s, in the case that c0 ≥ 1. If only a subset P of prime numbers features in the Dirichlet series of , then the operator C admits an associated orthogonal decomposition. Under sparseness assumptions on P we use this to asymptotically estimate the approximation numbers of C. Furthermore, in the case that is supported on a single prime number, we affirmatively settle the problem of describing the compactness of C in terms of the ordinary Nevanlinna counting function. We give detailed applications of our results to affine symbols and to angle maps.