The invariant connection of a 1/2-pinched Anosov diffeomorphism and rigidity

Let f be a C-infinity Anosov diffeomorphism of a compact manifold M, preserving a smooth measure. If f satisfies the 1/2-pinching assumption defined below, it must preserve a continuous affine connection for which the leaves of the Anosov foliations are totally geodesic, geodesically complete, and flat (its tangential curvature is defined along individual leaves). If this connection, which is the unique f-invariant affine connection on M, is C-tau-differentiable, tau greater than or equal to 2 then f is conjugate via a C-tau+2-affine diffeomorphism to a hyperbolic automorphism of a geodesically complete flat manifold. If f preserves a smooth symplectic form, has C-3 Anosov foliations, and satisfies the 2: l-nonresonance condition (an assumption that is weaker than pinching), then f is C-infinity conjugate to a hyperbolic automorphism of a complete flat manifold. (In the symplectic case, the invariant connection is the one previously defined by Kanai in the context of geodesic flows.) If the foliations are C-2 and the holonomy pseudo-groups satisfy a certain growth condition, the same conclusion holds.