Irreducible groups and ergodicity in the boundary

Abstract

We show that if G is a real semi-simple Lie group, and is a discrete subgroup of G containing a subgroup acting ergodically (in a strong sense) on the Furstenberg boundary of G, then is not isomorphic to a free product of with Z. Moreover, if has algebraic entries, then has algebraic entries as well. As a consequence, we show that if all irreducible discrete subgroups of SL2(R) × SL2(R) act ergodically on S1× S1 , such groups cannot be free groups (or even Gromov hyperbolic). In the appendix, we discuss a connection between the existence of discrete irreducible groups and diophantine properties of Lie groups.

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