Superrigid subgroups of solvable Lie groups
arXiv:math/9607221
Abstract
Let $Î$ be a discrete subgroup of a simply connected, solvable Lie group~$G$, such that $\Ad_GÎ$ has the same Zariski closure as $\Ad G$. If $α\colon Î\to \GL_n(\real)$ is any finite-dimensional representation of~$Î$,we show that $α$ virtually extends to a continuous representation~$Ï$ of~$G$. Furthermore, the image of~$Ï$ is contained in the Zariski closure of the image of~$α$. When $Î$ is not discrete, the same conclusions are true if we make the additional assumption that the closure of $[Î, Î]$ is a finite-index subgroup of $[G,G] \cap Î$ (and $Î$ is closed and $α$ is continuous).