Global Rigidity of Codimension One Actions
Abstract
Consider a smooth, locally free, codimension-one action of a higher-rank, simple, split Lie group G on a closed manifold M. Let P be a minimal parabolic subgroup of G. If the action admits a P-invariant probability measure that is mixing, then the action is either equivariantly diffeomorphic to the suspension of a codimension one, locally free action on a closed manifold of a parabolic subgroup of G; or, it is finitely and equivariantly covered by the action of G on G/× S1, where the action on G/ is the coset action, and G acts trivially on S1. We prove this by doing a jointly integration argument of stable and center unstable Pesin manifolds. This is a smooth version of results by Nevo and Zimmer.
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