Central extensions and bounded cohomology
Abstract
It was shown by Gersten that a central extension of a finitely generated group is quasi-isometrically trivial provided that its Euler class is bounded. We say that a finitely generated group satisfies Property QITB (quasi-isometrically trivial implies bounded) if the Euler class of any quasi-isometrically trivial central extension of is bounded. We exhibit a finitely generated group which does not satisfy Property QITB. This answers a question by Neumann and Reeves, and provides partial answers to related questions by Wienhard and Blank. We also prove that Property QITB holds for a large class of groups, including amenable groups, right-angled Artin groups, relatively hyperbolic groups with amenable peripheral subgroups, and 3-manifold groups. Finally, we show that Property QITB holds for every finitely presented group if a conjecture by Gromov on bounded primitives of differential forms holds as well.
Keywords
Cite
@article{arxiv.2003.01146,
title = {Central extensions and bounded cohomology},
author = {Roberto Frigerio and Alessandro Sisto},
journal= {arXiv preprint arXiv:2003.01146},
year = {2022}
}
Comments
v3: Final version to appear on Annales Henri Lebesgue