Measure rigidity for generalized u-Gibbs states and stationary measures via the factorization method
Abstract
We obtain measure rigidity results for stationary measures of random walks generated by diffeomorphisms, and for actions of SL(2,R) on smooth manifolds. Our main technical result, from which the rest of the theorems are derived, applies also to the case of a single diffeomorphism or 1-parameter flow and establishes extra invariance of a class of measures that we call ``generalized u-Gibbs states''.
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