Singularity of Furstenberg measure for infinite covolume discrete subroups in higher rank
Abstract
We consider symmetric random walks on discrete, Zariski-dense subgroups of a semisimple Lie group G with Property (T). We prove that if has infinite covolume, then the associated hitting measure on the Furstenberg boundary of G is singular. This is in contrast to Furstenberg's discretization of Brownian motion to lattices, and it is the first result of this type when G has higher rank.
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