Quasi-Invariance of the Dirichlet series kernels, Analytic symbols and Homogeneous operators

Abstract

For a scalar matrix a=(am, n)m, n=1∞, the Dirichlet series kernel a is the double Dirichlet series a(s, u) = Σm, n =1∞ am, nm-s n-u in the variables s and u, which is regularly convergent on some right half-plane H. The analytic symbols An, a = Σm=1∞am, nm-s, n ≥ 1 play a central role in the study of the reproducing kernel Hilbert space H a associated with the positive semi-definite kernel a. In particular, they form a total subset of H a and provide the formula Σn=1∞ f, An, a n-s, s ∈ H, for f ∈ H a. We combine the basic theory of Dirichlet series kernels with the Gelfond-Schneider theorem (Hilbert's seventh problem) to show that any quasi-invariant Dirichlet series kernel a(s, u) factors as f(s)f(u) for some Dirichlet series f on H. In particular, there is no quasi-invariant Dirichlet series kernel a if the dimension of H a is bigger than one. This is in strict contrast with the case of the unit disc, where non-factorable quasi-invariant kernels exist in abundance. We further discuss the Dirichlet series kernels a invariant under the group T of translation automorphisms of H and construct a family of densely defined T-homogeneous operators in H a, whose adjoints are defined only at the zero vector.