On the first-order genus of wreath products and their central extensions
Abstract
We prove that groups of the form Zm \, wr\, Zn, where m,n ∈ N, are regularly bi-interpretable with Z and therefore are first-order rigid: every finitely generated group elementarily equivalent to Zm \, wr\, Zn is isomorphic to Zm \, wr\, Zn. On the other hand, we show that Z2 \, wr\, Z admits 20 elementarily equivalent, pairwise non-isomorphic central extensions with finite kernel.
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