Multipliers of Dirichlet series and monomial series expansions of holomorphic functions in infinitely many variables

Abstract

Let H∞ be the set of all ordinary Dirichlet series D=Σn an n-s representing bounded holomorphic functions on the right half plane. A multiplicative sequence (bn) of complex numbers is said to be an 1-multiplier for H∞ whenever Σn |an bn| < ∞ for every D ∈ H∞. We study the problem of describing such sequences (bn) in terms of the asymptotic decay of the subsequence (bpj), where pj denotes the jth prime number. Given a multiplicative sequence b=(bn) we prove (among other results): b is an 1-multiplier for H∞ provided |bpj| < 1 for all j and n 1 n Σj=1n bpj*2 < 1, and conversely, if b is an 1-multiplier for H∞, then |bpj| < 1 for all j and n 1 n Σj=1n bpj*2 ≤ 1 (here b* stands for the decreasing rearrangement of b). Following an ingenious idea of Harald Bohr it turns out that this problem is intimately related with the question of characterizing those sequences z in the infinite dimensional polydisk D∞ (the open unit ball of ∞) for which every bounded and holomorphic function f on D∞ has an absolutely convergent monomial series expansion Σα ∂α f(0)α! zα. Moreover, we study analogous problems in Hardy spaces of Dirichlet series and Hardy spaces of functions on the infinite dimensional polytorus T∞.