A Novel Generalization of the Liouville Function $λ(n)$ and a Convergence Result for the Associated Dirichlet Series

Abstract: We introduce a novel arithmetic function $w(n)$, a generalization of the Liouville function $\lambda(n)$, as the coefficients of a Dirichlet series. By spatially encoding information in a natural way about the distribution of prime factors among natural numbers, $w(n)$ allows results to be obtained which rely intrinsically on the distribution of primes without having direct knowledge of that distribution. We prove some properties of the distribution of $w(n)$ and then provide a result on the convergence of its Dirichlet series. A parametrized family of functions $w_m(n)$ is defined of which $w(n)$ is a special case. We show that each function $w_m(n)$ injectively maps $\mathbb{N}$ into a dense subset of the unit circle in $\mathbb{C}$ and that each $F_m(s) = \sum_n \frac{w_m(n)}{n^s}$ converges for all $s$ with $\Re(s)\in\left(\frac{1}{2},1\right)$. Finally, we show that the family of functions $w_m(n)$ converges to $\lambda(n)$ and that $F_m(s)$ converges uniformly in $m$ to $\sum_n \frac{\lambda(n)}{n^s}$, implying convergence of that series in the same region and thereby proving an interesting property about a closely related function.