The nonabelian product modulo sum
Abstract
It is shown that if \Hn\n ∈ ω is a sequence of groups without involutions, with 1 < |Hn| ≤ 20, then the topologist's product modulo the finite words is (up to isomorphism) independent of the choice of sequence. This contrasts with the abelian setting: if \An\n ∈ ω is a sequence of countably infinite torsion-free abelian groups, then the isomorphism class of the product modulo sum Πn ∈ ω An/n ∈ ω An is dependent on the sequence.
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