Connected Components of Complex Divisor Functions
arXiv:1711.04244
Abstract
For any complex number $c$, define the divisor function $Ï_c\colon\mathbb N\to\mathbb C$ by $\displaystyleÏ_c(n)=\sum_{d\mid n}d^c$. Let $\overline{Ï_c(\mathbb N)}$ denote the topological closure of the range of $Ï_c$. Extending previous work of the current author and Sanna, we prove that $\overline{Ï_c(\mathbb N)}$ has nonempty interior and has finitely many connected components if $\Re(c)\leq 0$ and $c\neq 0$. We end with some open problems.
14 pages, 3 figures