Algebras and Banach spaces of Dirichlet series with maximal Bohr's strip

Abstract: We study linear and algebraic structures in sets of Dirichlet series with maximal Bohr's strip. More precisely, we consider a set $\mathscr M$ of Dirichlet series which are uniformly continuous on the right half plane and whose strip of uniform but not absolute convergence has maximal width, i.e., $\frac{1}{2}$. Considering the uniform norm, we show that $\mathscr M$ contains an isometric copy of $\ell_1$ (except zero) and is strongly $\aleph_0$-algebrable. Also, there is a dense $G_\delta$ set such that any of its elements generates a free algebra contained in $\mathscr M\cup {0}$. Furthermore, we investigate $\mathscr{M}$ as a subset of the Hilbert space of Dirichlet series whose coefficients are square-summable. In this case, we prove that $\mathscr M$ contains an isometric copy of $\ell_2$ (except zero).