Multipliers of the Hilbert spaces of Dirichlet series

Abstract

For a sequence w = \wj\j = 2∞ of positive real numbers, consider the positive semi-definite kernel w(s, u) = Σj = 2∞ wj j-s - u defined on some right-half plane H for a real number . Let H w denote the reproducing kernel Hilbert space associated with w. Let equation* δ w = ∈f\(s) : Σj ≥slant 2 \\ gpf(j) ≤slant pn wj j- s < ∞ ~for all~ n ∈ Z+\, equation* where \pj\j ≥slant 1 is an increasing enumeration of prime numbers and gpf(n) denotes the greatest prime factor of an integer n ≥slant 2. If w satisfies equation* Σj ≥slant 2\\ j | n j-δ w wj μ(nj) ≥slant 0, n ≥slant 2, equation* where μ is the Mobius function, then the multiplier algebra M( H w) of H w is isometrically isomorphic to the space of all bounded and holomorphic functions on Hδ w2 that are representable by a convergent Dirichlet series in some right half plane. As a consequence, we describe the multiplier algebra M( H w) when w is an additive function satisfying δ w ≤slant 0 and align* wpj-1wpj ≤slant p-δ w~for all integers ~~ j ≥slant 2~and all prime numbers~p. align* Moreover, we recover a result of Stetler that classifies the multipliers of H w when w is multiplicative. The proof of the main result is a refinement of the techniques of Stetler.