Bounded Generation of Submonoids of Heisenberg Groups
Abstract
If G is a nilpotent group and [G,G] has Hirsch length 1, then every f.g. submonoid of G is boundedly generated, i.e. a product of cyclic submonoids. Using a reduction of Bodart, this implies the decidability of the submonoid membership problem for nilpotent groups G where [G,G] has Hirsch length 2.
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