Superrigidity of Hyperbolic Buildings

Let ‫އ‬ be a connected, solvable linear algebraic group over a number field K, let Ž . S be a finite set of places of K that contains all the infinite places, and let O O S be the ring of S-integers of K. We define a certain closed subgroup ‫އ‬ of ‫އ‬ s Ł ‫އ‬ that contains ‫އ‬ , and prove that ‫އ‬

Berlin to the case of the more general non-reductive target group F. We also provide a proof of the cocycle superrigidity theorem in the case of algebraic groups defined over a local field of positive characteristic and the generalization of this proof to the case of the more general target group an

We formulate a Borel version of a corollary of Furman's superrigidity theorem for orbit equivalence and present a number of applications to the theory of countable Borel equivalence relations. In particular, we prove that the orbit equivalence relations arising from the natural actions of SL3(Z) on