English

Minimal surfaces for Hitchin representations

Differential Geometry 2017-05-17 v2

Abstract

Given a reductive representation ρ:π1(S)G\rho: \pi_1(S)\rightarrow G, there exists a ρ\rho-equivariant harmonic map ff from the universal cover of a fixed Riemann surface Σ\Sigma to the symmetric space G/KG/K associated to GG. If the Hopf differential of ff vanishes, the harmonic map is then minimal. In this paper, we investigate the properties of immersed minimal surfaces inside symmetric space associated to a subloci of Hitchin component: qnq_n and qn1q_{n-1} case. First, we show that the pullback metric of the minimal surface dominates a constant multiple of the hyperbolic metric in the same conformal class and has a strong rigidity property. Secondly, we show that the immersed minimal surface is never tangential to any flat inside the symmetric space. As a direct corollary, the pullback metric of the minimal surface is always strictly negatively curved. In the end, we find a fully decoupled system to approximate the coupled Hitchin system.

Keywords

Cite

@article{arxiv.1605.09596,
  title  = {Minimal surfaces for Hitchin representations},
  author = {Song Dai and Qiongling Li},
  journal= {arXiv preprint arXiv:1605.09596},
  year   = {2017}
}

Comments

24 pages, revised version, to appear in J. Differ. Geom

R2 v1 2026-06-22T14:13:45.481Z