Extremal distributions of partially hyperbolic systems: the Lipschitz threshold

Abstract

We prove a sharp phase transition in the regularity of the extremal distribution Es Eu for C∞ volume-preserving partially hyperbolic diffeomorphisms on closed 3-manifolds: if Es Eu is Lipschitz, then it is automatically C∞. This extends the rigidity phenomenon established by Foulon--Hasselblatt for conservative Anosov flows in dimension 3 to the partially hyperbolic setting. This gain in regularity has several applications to rigidity problems. In particular, we study the relationship between the -integrability condition introduced by Eskin--Potrie--Zhang and joint integrability in the conservative setting, yielding rigidity results for u-Gibbs measures. We also obtain several C∞ classification results for partially hyperbolic diffeomorphisms on 3-manifolds under various assumptions.