Short Laws for Finite Groups and Residual Finiteness Growth
Abstract
We prove that for every n ∈ N and δ>0 there exists a word wn ∈ F2 of length n2/3 (n)3+δ which is a law for every finite group of order at most n. This improves upon the main result of [A. Thom, About the length of laws for finite groups, Isr. J. Math.]. As an application we prove a new lower bound on the residual finiteness growth of non-abelian free groups.
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