Zariski-dense Hitchin representations in uniform lattices
Abstract
We construct Zariski-dense surface subgroups in infinitely many commensurability classes of uniform lattices of the split real Lie groups SL(n,R), Sp(2n,R), SO(k+1,k), and G2. These subgroups are images of Hitchin representations. In particular, we show that every uniform lattice of Sp(2n,R), of SO(k+1,k) with k1,2[4] and of G2 contains infinitely many mapping class group orbits of Zariski-dense Hitchin representations of fixed genus. Together with Long-Thistlethwaite and with a previous paper of the author, it implies that all lattices of Sp(4,R) contain a Zariski-dense surface subgroup.
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