The residual finiteness growth $\text{RF}_G: \mathbb{N} \to \mathbb{N}$ of a finitely generated group $G$ is a function that gives the smallest value of the index $[G:N]$ with $N$ a normal subgroup not containing a non-trivial element $g$, in function of the word norm of that element $g$. It has been studied for several classes of finitely generated groups, including free groups, linear groups and virtually abelian groups. In this paper, we focus on $\text{RF}_G$ for the class of nilpotent groups, leading to three different results.
First, we demonstrate that this function does not change when taking finite index subgroups within this class, so it forms a commensurability invariant. Next, we introduce a similar function on nilpotent Lie rings and show that every group corresponds to a nilpotent Lie ring with an equivalent residual finiteness growth. Finally, we define a new residual finiteness growth function by restricting to normal subgroups $N$ such that $G^p \subset N \subset G$ for some prime number $p$. After computing this new function for all finitely generated nilpotent groups, we show that it is equal to the earlier upper bound for $\text{RF}_G$ established in the literature and which was conjectured to be exact.
