On Foliations in PSL(4,R)-Teichm\"uller Theory

Abstract

We carry out a detailed study of the structure of domains of discontinuity in RP3 of PSL4(R)-Hitchin representations . We then prove the foliated component 1 of has exactly two group-invariant foliations by properly embedded projective line segments and has a unique foliation by properly embedded convex domains in projective planes. This gives a finiteness counterpart to work of Guichard and Wienhard. We also prove analogues for the non-foliated component 2 and deduce a rigidity of projective equivalences of properly convex foliated projective structures on unit tangent bundles of surfaces.

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