Co-Hopfianity is not a profinite property
Abstract
We exhibit two finitely generated residually finite groups G and H with isomorphic profinite completions G H, such that G is co-Hopfian while H is not. The construction utilizes Wise's residually finite version of the Rips construction applied to a finitely presented acyclic group U with trivial profinite completion and a strong universality property. A key feature of our approach is the construction of H as a preimage subgroup of G which is conjugate to a proper subgroup of itself. This renders the non-co-Hopfianity of H immediate without requiring a detailed structural analysis of the Rips kernel.
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