Restrictions on Anosov subgroups of Sp(2n,R)

Abstract

Let n∈N and let ⊂ \1,…,n\ be a non-empty subset. We prove that if contains an odd integer, then any P-Anosov subgroup of Sp(2n,R) is virtually isomorphic to a free group or a surface group. In particular, any Borel Anosov subgroup of Sp(2n,R) is virtually isomorphic to a free or surface group. On the other hand, if does not contain any odd integers, then there exists a P-Anosov subgroup of Sp(2n,R) which is not virtually isomorphic to a free or surface group. We also exhibit new examples of maximally antipodal subsets of certain flag manifolds; these arise as limit sets of rank 1 subgroups.