English

A note on trace fields of complex hyperbolic groups

Differential Geometry 2013-03-08 v1

Abstract

We show that if Γ\Gamma is an irreducible subgroup of SU(2,1){\rm SU}(2,1), then Γ\Gamma contains a loxodromic element AA. If AA has eigenvalues λ1=λeiφ,\lambda_1 = \lambda e^{i\varphi}, λ2=e2iφ\lambda_2 = e^{-2i\varphi}, λ3=λ1eiφ\lambda_3 = \lambda^{-1}e^{i\varphi}, we prove that Γ\Gamma is conjugate in SU(2,1){\rm SU}(2,1) to a subgroup of SU(2,1,Q(Γ,λ)),{\rm SU}(2,1,\mathbb{Q}(\Gamma,\lambda)), where Q(Γ,λ)\mathbb{Q}(\Gamma, \lambda) is the field generated by the trace field Q(Γ)\mathbb{Q}(\Gamma) of Γ\Gamma and λ\lambda. It follows from this that if Γ\Gamma is an irreducible subgroup of SU(2,1){\rm SU}(2,1) such that the trace field Q(Γ)\mathbb{Q}(\Gamma) is real, then Γ\Gamma is conjugate in SU(2,1){\rm SU}(2,1) to a subgroup of SO(2,1){\rm SO}(2,1). As a geometric application of the above, we get that if GG is an irreducible discrete subgroup of PU(2,1){\rm PU}(2,1), then GG is an R\mathbb{R}-Fuchsian subgroup of PU(2,1){\rm PU}(2,1) if and only if the invariant trace field k(G)k(G) of GG is real.

Keywords

Cite

@article{arxiv.1303.1701,
  title  = {A note on trace fields of complex hyperbolic groups},
  author = {Heleno Cunha and Nikolay Gusevskii},
  journal= {arXiv preprint arXiv:1303.1701},
  year   = {2013}
}

Comments

To appear in Groups, Geometry, and Dynamics

R2 v1 2026-06-21T23:38:13.462Z