Stationary measures and random walks on A2-buildings
Abstract
We consider a non-elementary group action G X of a locally compact second countable group G on a possibly exotic non-discrete affine building X of type A2. We prove that if μ is an admissible symmetric probability measure on G, there is a unique μ-stationary measure supported on the chambers of the spherical building at infinity. We use this result to study random walks induced by the G-action, and we prove that if μ has finite second moment, (Zn o) converges almost surely to a regular point of the boundary and the Lyapunov spectrum of the random walk is simple. Applied to Bruhat-Tits buildings, these results extend some classical theorems due to H.~Furstenberg.
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