Measure rigidity for random dynamics on surfaces with positive entropy

Abstract

Given a surface M and a Borel probability measure on the group of C2-diffeomorphisms of M, we study -stationary probability measures on M. Assuming the positivity of a certain entropy, the following dichotomy is proved: either the stable distributions for the random dynamics is non-random, or the measure is SRB. In the case that -a.e. diffeomorphism preserves a common smooth measure m, we show that for any positive-entropy stationary measure μ, either there exists a -almost surely invariant μ-measurable line field (corresponding do the stable distributions for almost every random composition) or the measure μ is -almost surely invariant and coincides with an ergodic component of m. To prove the above result, we introduce a skew product with surface fibers over a measure preserving transformation equipped with an increasing sub-σ-algebra F. Given an invariant measure μ for the skew product, and assuming the F-measurability of the `past dynamics' and the fiber-wise conditional measures, we prove a dichotomy: either the fiber-wise stable distributions are measurable with respect to a related increasing sub-σ-algebra, or the measure μ is fiber-wise SRB.