On Banach subalgebras of H∞ consisting of lacunary Dirichlet series

Abstract

Let H∞ be the set of all Dirichlet series f=Σn=1∞ ann-s (where an∈C for all n∈N=\1,2,3,·s\) that converge at each s in C0=\s∈ C:Re(s)>0\, such that \|f\|∞=s∈C0|f(s)|<∞. Then H∞ is a Banach algebra with pointwise operations and the supremum norm \|·\|∞, and has been studied in earlier works. The article introduces a new family of Banach subalgebras H∞S of H∞. For S⊂N, let H∞S be the set of all elements Σn=1∞ ann-s∈ H∞ such that for all n∈ N S, we have an=0. Then H∞S is a unital Banach subalgebra of H∞ with the supremum norm if and only if S is a multiplicative subsemigroup of N containing 1. It is shown that for such S, H∞S is the multiplier algebra of H2S, where H2S is the Hilbert space of all Dirichlet series f=Σn∈ S ann-s such that \|f\|2:=(Σn∈ S |an|2)12<∞. A characterisation of the group of units in H∞S is also given, by showing an analogue of the Wiener 1/f theorem for H∞S. If S has a set of generators allowing a unique representation of each element of S, then it is shown that the Bass stable rank of H∞S is infinite.