A paradifferential approach for hyperbolic dynamical systems and applications

Abstract

We develop a paradifferential approach for studying non-smooth hyperbolic dynamics and related non-linear PDE from a microlocal point of view. As an application, we describe the microlocal regularity, i.e the Hs wave-front set for all s, of the unstable bundle Eu for an Anosov flow. We also recover rigidity results of Hurder-Katok and Hasselblatt in the Sobolev class rather than H\"older: there is s0>0 such that if Eu has Hs regularity for s>s0 then it is smooth (with s0=2 for volume preserving 3-dimensional Anosov flows). In the appendix by Guedes Bonthonneau, it is also shown that it can be applied to deal with non-smooth flows and potentials. This work could serve as a toolbox for other applications.