English

Geometric Structures for $G_2'$-Surface Group Representations

Differential Geometry 2025-10-15 v1 Geometric Topology

Abstract

Let SS be a closed surface of genus g2g \geq 2. We construct locally homogeneous geometric structures on closed 5-manifolds fibering over SS, modeled on the two partial flag manifolds Ein2,3\mathrm{Ein}^{2,3} and Pho×\mathrm{Pho}^\times of the split real form G2\mathrm{G}_2' of the complex exceptional Lie group G2C\mathrm{G}_2^{\mathbb{C}}. To this end, we consider two families of representations π1SG2\pi_1S\rightarrow \mathrm{G}_2' constructed via the non-abelian Hodge correspondence from cyclic Higgs bundles, one associated with each G2\mathrm{G}_2'-partial flag manifold. Each family includes G2\mathrm{G}_2'-Hitchin representations, but is much more general. For each representation of the first family, the β\beta-bundles, we construct (G2,Ein2,3)(\mathrm{G}_2', \mathrm{Ein}^{2,3})-geometric structures on Ein2,1\mathrm{Ein}^{2,1}-fiber bundles over SS, and for Hodge bundles in the second family we construct (G2,Pho×)(\mathrm{G}_2, \mathrm{Pho}^\times)-geometric structures on (RP2×S1)(\mathbb{R} \mathbb{P}^2\times \mathbb{S}^1)-bundles over SS. In the case of G2\mathrm{G}_2'-Hitchin Hodge bundles, which belong to both families, we show the image of the developing map of the respective geometric structures is exactly the domain of discontinuity defined by Guichard-Wienhard and Kapovich-Leeb-Porti. Each construction can be interpreted as converting a family of equivariant JJ-holomorphic curves in the pseudosphere S2,4\mathbb{S}^{2,4} into geometric structures on fiber bundles MSM \rightarrow S. The approach used to build geometric structures, namely \emph{moving bases of pencils}, gives a unified description of analytic geometric structures constructions using Higgs bundles and harmonic maps in rank two.

Keywords

Cite

@article{arxiv.2510.12757,
  title  = {Geometric Structures for $G_2'$-Surface Group Representations},
  author = {Colin Davalo and Parker Evans},
  journal= {arXiv preprint arXiv:2510.12757},
  year   = {2025}
}

Comments

73 pages + 10 pages appendices. 4 figures

R2 v1 2026-07-01T06:37:09.612Z