Finite central extensions of o-minimal groups

Elías Baro, Daniel Palacín

Published 2024-07-23Version 1

We answer in the affirmative a conjecture of Berarducci, Peterzil and Pillay \cite{BPP10} for solvable groups, which is an o-minimal version of a particular case of Milnor's isomorphism conjecture \cite{jM83}. We prove that every finite central extension of a definably connected solvable definable group in an o-minimal structure is equivalent to a finite central extension which is definable without additional parameters. The proof relies on an o-minimal adaptation of the higher inflation-restriction exact sequence due to Hochschild and Serre. As in \cite{jM83}, we also prove in o-minimal expansions of real closed fields that the conjecture reduces to definably simple groups.