Residual Finiteness Growth in Virtually Nilpotent Groups
Abstract
The residual finiteness growth RFG: N 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. This paper shows that if G is virtually nilpotent, then RFG = δ for some δ∈ N\0\, with moreover an explicit formula for δ in terms of Lie algebras. This implies in particular that it is an invariant of the complex Mal'cev completion, leading to the application that residual finiteness growth is a profinite invariant for virtually nilpotent groups.
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