Sections of Submonoids of Nilpotent Groups

Abstract

We show that every product of f.g.\ submonoids of a group G is a section of a f.g.\ submonoid of G×H5(Z), where H5(Z) is a Heisenberg group. This gives us a converse of a reduction of Bodart, and a new simple proof of the existence of a submonoid of a nilpotent group of class 2 with undecidable membership problem.

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