Interpreting a field in its Heisenberg group

Abstract

We improve on and generalize a 1960 result of Maltsev. For a field F, we denote by H(F) the Heisenberg group with entries in F. Maltsev showed that there is a copy of F defined in H(F), using existential formulas with an arbitrary non-commuting pair (u,v) as parameters. We show that F is interpreted in H(F) using computable 1 formulas with no parameters. We give two proofs. The first is an existence proof, relying on a result of Harrison-Trainor, Melnikov, R. Miller, and Montalb\'an. This proof allows the possibility that the elements of F are represented by tuples in H(F) of no fixed arity. The second proof is direct, giving explicit finitary existential formulas that define the interpretation, with elements of F represented by triples in H(F). Looking at what was used to arrive at this parameter-free interpretation of F in H(F), we give general conditions sufficient to eliminate parameters from interpretations.