On Einstein Structures for SO0(p,p+1)-Surface Group Representations

Abstract

Let S be a closed surface of genus g ≥ 2. We study the cocompact domain of discontinuity in the Einstein universe Einp-1,p defined by Guichard-Wienhard and Kapovich-Leeb-Porti for a class of p-Anosov representations :π1S → SO0(p,p+1) including Hitchin representations, for p ≥ 3. The quotient M = (π1S) is abstractly known to be realizable as a fiber bundle over S, with unknown fiber of unique homotopy type F. We explicitly exhibit M as a smooth F-fiber bundle over S, determining the diffeomorphism type of M and the unique homotopy type F. Surprisingly, in many situations the fiber bundle F → M→ S is trivial.

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