Boundaries, Weyl groups, and Superrigidity
arXiv:1109.3482
Abstract
This note describes a unified approach to several superrigidity results, old and new, concerning representations of lattices into simple algebraic groups over local fields. For an arbitrary group $Î$ and a $Î$-boundary $B$ we associate certain generalized Weyl group $W_{Î,B}$ and show that any representation with a Zariski dense unbounded image in a simple algebraic group, $Ï:Î\to \mathbf{H}$, defines a special homomorphism $W_{Î,B}\to {\rm Weyl}(\mathbf{H})$. This general fact allows to deduce the aforementioned superrigidity results.
7 pages