Abstract
A Flag structure on a 3-manifold is an (X;G) structure where G = SL(3,R) and X is the space of flags on the 2-dimensional projective space. We construct a flag structure on a cusped hyperbolic manifold with unipotent boundary holonomy. The holonomy representation can be obtained from a punctured torus group representation into SL(3,R) which is equivariant under a pseudo-Anosov.
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