Geometric Structures for the G2'-Hitchin Component

Abstract

We give an explicit geometric structures interpretation of the G2'-Hitchin component Hit(S, G2') ⊂ (π1S,G2') of a closed oriented surface S of genus g ≥ 2. In particular, we prove Hit(S, G2') is naturally homeomorphic to a moduli space M of (G,X)-structures for G = G2' and X = Ein2,3 on a fiber bundle C over S via the descended holonomy map. Explicitly, C is the direct sum of fiber bundles C = UTS UTS R+ with fiber Cp = UTp S × UTp S × R+, where UT S denotes the unit tangent bundle. The geometric structure associated to a G2'-Hitchin representation is explicitly constructed from the unique associated -equivariant alternating almost-complex curve : S → S2,4; we critically use recent work of Collier-Toulisse on the moduli space of such curves. Our explicit geometric structures are examined in the G2'-Fuchsian case and shown to be unrelated to the (G2', Ein2,3)-structures of Guichard-Wienhard.

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