What question did this study set out to answer?

The aim is to investigate Banach subalgebras of the Dirichlet Hardy algebra consisting of lacunary Dirichlet series.

January 22, 2026Open Access

On Banach subalgebras of the Dirichlet Hardy algebra H^ consisting of lacunary Dirichlet series

Key Points

The aim is to investigate Banach subalgebras of the Dirichlet Hardy algebra consisting of lacunary Dirichlet series.
Defined the set $$\mathscr {H}^\infty$$ and its properties.
Examined the convergence of Dirichlet series in the half-plane $$\mathbb {C}_0$$.
Analyzed pointwise operations and the supremum norm within this algebra.
Identified key properties of $$\mathscr {H}^\infty$$ as a Banach algebra.
Demonstrated that series converge for selected values of $$s$$ in the half-plane.
Explored implications for lacunary series in this context.

Abstract

Abstract Let H^ H ∞ be the set of all Dirichlet series f\!=\!{ ₍=₁^ } aₙn^-s f = ∑ n = 1 ∞ a n n - s (where aₙ\! C a n ∈ C for all n\! \! N\!=\!\1, 2, 3, \ n ∈ N = 1, 2, 3, ⋯) that converge at each s in the half-plane C₀\!: =\!\s\! \! {C\!: \! Re (s) \!>\!0\} C 0: = s ∈ C: Re (s) > 0, such that f \!=\! ₒ ₂₀\!|f (s) |\! ‖ f ‖ ∞ = sup s ∈ C 0 | f (s) | ∞. Then H^ H ∞ is a Banach algebra with pointwise operations and the supremum norm _ ‖ · ‖ ∞

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