Atomic physical measures for non-invertible random dynamical systems
Abstract
We construct an example of a random dynamical system on the circle, formed by maps that are only locally invertible, which possesses an atomic stationary measure ν. Moreover, this measure is physical: for Lebesgue-almost every initial point x0, the Cesàro averages of its random trajectory almost surely converge to ν. This shows that the Hölder regularity of stationary measures, known for (non-measure-preserving) random dynamical systems formed by diffeomorphisms, cannot be generalized to this class of systems. We also provide some related examples, including ones where a stationary measure charges a proper submanifold, despite the absence of a closed common invariant submanifold.
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