Zariski dense non-tempered subgroups in higher rank of nearly optimal growth
Abstract
We construct the first example of a Zariski-dense, discrete, non-lattice subgroup 0 of a higher rank simple Lie group G, which is non-tempered in the sense that the quasi-regular representation L2(0 G) is non-tempered. More precisely, let n 3 and let be the fundamental group of a closed hyperbolic n-manifold that contains a properly embedded totally geodesic hyperplane. We show that there exists a non-empty open subset O of Hom(, SO(n,2)) such that for any σ∈ O, the subgroup σ() is a Zariski-dense and non-tempered Anosov subgroup of SO(n,2). In addition, the growth indicator of σ() is nearly optimal: it almost realizes the supremum of growth indicators among all non-lattice discrete subgroups, a bound imposed by property (T) of SO(n,2).
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