English

Para-complex geometry and cyclic Higgs bundles

Differential Geometry 2025-03-04 v1 Geometric Topology

Abstract

We introduce para-complex and pseudo-Riemannian geometric methods for the study of representations of surface groups in SL(2m+1,R)\mathrm{SL}(2m+1,\mathbb{R}). For m=1m=1 our techniques allow to recover several known results for Hitchin representations without any reference to convex projective geometry or hyperbolic affine spheres. In particular, we describe analytically the Guichard-Wienhard domain of discontinuity in the flag variety and the corresponding concave foliated flag structure of Nolte-Riestenberg. In higher rank, we obtain a one-to-one correspondence between stable cyclic SL(2m+1,R)\mathrm{SL}(2m+1,\mathbb{R})-Higgs bundles (not necessarily in the Hitchin component) and a special class of surfaces, which we call isotropic P\mathbf{P}-alternating, in the para-complex hyperbolic space Hτ2m\mathbb{H}^{2m}_{\tau}. As a result, we give a geometric interpretation to the holomorphic differential q2m+1q_{2m+1} in the Hitchin base in terms of harmonic sequences for immersions in para-complex manifolds.

Keywords

Cite

@article{arxiv.2503.01615,
  title  = {Para-complex geometry and cyclic Higgs bundles},
  author = {Nicholas Rungi and Andrea Tamburelli},
  journal= {arXiv preprint arXiv:2503.01615},
  year   = {2025}
}

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R2 v1 2026-06-28T22:04:46.109Z