Some model theory of the Heisenberg group
Abstract
We show that a field K is model complete (in the language of rings) if and only if the Heisenberg group H(K) is model complete (in the language of groups). To show that, we extend Levchuk's result about automorphisms of H(K) to the case of monomorphisms H(K) H(M). We also show that H(K) does not have quantifier elimination and discuss its (non-)bi-interpretability with K.
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