A note on trace fields of complex hyperbolic groups
Differential Geometry
2013-03-08 v1
Abstract
We show that if is an irreducible subgroup of , then contains a loxodromic element . If has eigenvalues , , we prove that is conjugate in to a subgroup of where is the field generated by the trace field of and . It follows from this that if is an irreducible subgroup of such that the trace field is real, then is conjugate in to a subgroup of . As a geometric application of the above, we get that if is an irreducible discrete subgroup of , then is an -Fuchsian subgroup of if and only if the invariant trace field of 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