A mixed identity-free elementary amenable group
Abstract
A group G is called mixed identity-free if for every n ∈ N and every w ∈ G Fn there exists a homomorphism : G Fn → G such that is the identity on G and (w) is nontrivial. In this paper, we make a modification to the construction of elementary amenable lacunary hyperbolic groups given by Ol'shanskii, Osin, and Sapir to produce finitely generated elementary amenable groups which are mixed identity-free. As a byproduct of this construction, we also obtain locally finite p-groups which are mixed identity-free.
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