On Banach subalgebras of $\mathscr{H}^\infty$ consisting of lacunary Dirichlet series (2508.13127v1)

Abstract: Let $\mathscr{H}^\infty$ be the set of all Dirichlet series $f=\sum_{n=1}^\infty a_nn^{-s}$ (where $a_n\in\mathbb{C}$ for all $n\in\mathbb{N}={1,2,3,\cdots}$) that converge at each $s$ in $\mathbb{C}0={s\in \mathbb{C}:\text{Re}(s)>0}$, such that $|f|{\infty}=\sup_{s\in\mathbb{C}0}|f(s)|<\infty$. Then $\mathscr{H}^\infty$ is a Banach algebra with pointwise operations and the supremum norm $|\cdot|\infty$, and has been studied in earlier works. The article introduces a new family of Banach subalgebras $\mathscr{H}^\infty_{S}$ of $\mathscr{H}^\infty$. For $S\subset\mathbb{N}$, let $\mathscr{H}^\infty_{S}$ be the set of all elements $\sum_{n=1}^\infty a_nn^{-s}\in \mathscr{H}^\infty$ such that for all $n\in \mathbb{N}\setminus S$, we have $a_n=0$. Then $\mathscr{H}^\infty_{S}$ is a unital Banach subalgebra of $\mathscr{H}^\infty$ with the supremum norm if and only if $S$ is a multiplicative subsemigroup of $\mathbb{N}$ containing $1$. It is shown that for such $S$, $\mathscr{H}^\infty_{S}$ is the multiplier algebra of $\mathscr{H}^2_S$, where $\mathscr{H}^2_S$ is the Hilbert space of all Dirichlet series $f=\sum_{n\in S} a_nn^{-s}$ such that $|f|2:=(\sum{n\in S} |a_n|^2)^{\frac{1}{2}}<\infty$. A characterisation of the group of units in $\mathscr{H}^\infty_{S}$ is also given, by showing an analogue of the Wiener $1/f$ theorem for $\mathscr{H}^\infty_{S}$.