Classification of Conditional Measures Along Certain Invariant One-Dimensional Foliations

Abstract

Let f:M M be a homeomorphism over a compact Riemannian manifold, ergodic with respect to a measure μ defined on the completion of the Borel σ-algebra and F a f-invariant one dimensional continuous foliation of M by C1-leaves. Then, if f preserves a continuous F-arc length system, then we only have three possibilities for the conditional measures of μ along F, namely: - they are atomic for almost every leaf, or - for almost every leaf they are equivalent to the measure λx induced by the invariant arc-length system over F, or - for almost every leaf their support is a nowhere dense, perfect subset of the leaf. Furthermore, we show that restricted to ergodic partially hyperbolic diffeomorphism with one-dimensional topological neutral center direction, we are able to eliminate the third case obtaining a dichotomy.