Residual Finiteness Growth in Minimax Groups
Abstract
If g∈ G is a non-trivial element in a residually finite group, then there exists by definition a finite group Q and a homomorphism : G Q such that (g) ≠ e. The residual finiteness growth RFG of a finitely generated residually finite group G estimates the size of Q in terms of the word norm \|g\| of the element g∈ G. This function has been studied for several classes of groups, including free groups, lamplighter groups and nilpotent groups. For finitely generated linear groups G≤ GL(m, C) this function is known to be bounded by RFG(r) rm2+1, which is quadratic in m. This paper establishes an improved bound of the form RFG(r) r4k with k the Pr\"ufer rank of G for certain virtually solvable linear groups, namely minimax groups, a class which includes virtually polycyclic and Baumslag-Solitar groups. Moreover, the upper bound is invariant under taking finite extensions, and also establishes an improved polylogarithmic version for virtually nilpotent groups, generalizing the known exact bound for virtually abelian groups. If the group is not virtually nilpotent, we prove that RFG(r) is at least linear, improving a recent result.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.