Maximal ideal space of some Banach algebras of Dirichlet series
Abstract
Let H∞ be the set of all Dirichlet series f=Σn=1∞ anns (where an∈ C for each n) that converge at each s∈ C+, such that \|f\|∞:=s∈ C+|f(s)|<∞. Let B⊂ H∞ be a Banach algebra containing the Dirichlet polynomials (Dirichlet series with finitely many nonzero terms) with a norm \|·\|B such that the inclusion B ⊂ H∞ is continuous. For m∈ N=\1,2,3,·s\, let ∂-mB denote the Banach algebra consisting of all f∈ B such that f',·s, f(m)∈ B, with pointwise operations and the norm \|f\|∂-mB=Σ=0m 1!\|f()\|B. Assuming that the Wiener 1/f property holds for B (that is, ∈fs∈ C+ |f(s)|>0 implies 1f∈ B), it is shown that for all m∈ N, the maximal ideal space M(∂-mB) of ∂-mB is homeomorphic to DN, where D=\z∈ C:|z| 1\. Examples of such Banach algebras are H∞, the subalgebra Au of H∞ consisting of uniformly continuous functions in C+, and the Wiener algebra W of Dirichlet series with \|f\|W:=Σn=1∞ |an|<∞. Some consequences (existence of logarithms, projective freeness, infinite Bass stable rank) are given as applications.
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