Non-split linear sharply 2-transitive groups

Abstract

We give examples of countable linear groups in SLn(R) for n 3, with no nontrivial normal abelian subgroups, that admit a faithful sharply 2-transitive action on a set. Without the linearity assumption, such groups were recently constructed by Rips, Segev, and Tent. Our examples are of permutational characteristic 2, in the sense that involutions do not fix a point in the 2-transitive action.