Jonathan A. Hillman
Published 2020-04-08Version 1
We show that if a $PD_3$-group $G$ splits as an HNN extension $A*_C\varphi$ where $C$ is a $PD_3$-group then the Poincar\'e dual in $H^1(G;\mathbb{Z})=Hom(G,\mathbb{Z})$ of the homology class $[C]$ is the epimorphism $f:G\to\mathbb{Z}$ with kernel the normal closure of $A$. We also make several other observations about $PD_3$-groups which split over $PD_2$-groups.
The normal closure of a power of a half-twist has infinite index in the mapping class group of a punctured sphere
A remark on normal closures in free products of groups
A criterion for HNN extensions of finite $p$-groups to be residually $p$
![QR code for arXiv:2004.03803 [math.GR]](http://oss.arxitics.com/images/favicon.svg)