Projective cocycles over SL(2,R) actions: measures invariant under the upper triangular group

Abstract

We consider the action of SL(2,R) on a vector bundle H preserving an ergodic probability measure on the base X. Under an irreducibility assumption on this action, we prove that if is any lift of to a probability measure on the projectivized bunde P(H) that is invariant under the upper triangular subgroup, then is supported in the projectivization P(E1) of the top Lyapunov subspace of the positive diagonal semigroup. We derive two applications. First, the Lyapunov exponents for the Kontsevich-Zorich cocycle depend continuously on affine measures, answering a question in [MMY]. Second, if P(V) is an irreducible, flat projective bundle over a compact hyperbolic surface , with hyperbolic foliation F tangent to the flat connection, then the foliated horocycle flow on T1F is uniquely ergodic if the top Lyapunov exponent of the foliated geodesic flow is simple. This generalizes results in [BG] to arbitrary dimension.