Hausdorff and packing dimensions and measures for nonlinear transversally non-conformal thin solenoids

Abstract

We extend results by B. Hasselblatt, J. Schmeling in Dimension product structure of hyperbolic sets (2004), and by the third author and K. Simon in Hausdorff and packing measures for solenoids (2003), for C1+ hyperbolic, (partially) linear solenoids over the circle embedded in R3 non-conformally attracting in the stable discs Ws direction, to nonlinear ones. Under an assumption of transversality and assumptions on Lyapunov exponents for an appropriate Gibbs measure imposing thinness, assuming also there is an invariant C1+ strong stable foliation, we prove that Hausdorff dimension HD( Ws) is the same quantity t0 for all Ws and else HD()=t0+1. We prove also that for the packing measure 0<t0( Ws)<∞ but for Hausdorff measure HMt0( Ws)=0 for all Ws. Also 0<1+t0() <∞ and HM1+t0()=0. A technical part says that the holonomy along unstable foliation is locally Lipschitz, except for a set of unstable leaves whose intersection with every Ws has measure HMt0 equal to 0 and even Hausdorff dimension less than t0. The latter holds due to a large deviations phenomenon.