On the Asymptotic Number of Generators of High Rank Arithmetic Lattices
Abstract
Abert, Gelander and Nikolov [AGN17] conjectured that the number of generators d() of a lattice in a high rank simple Lie group H grows sub-linearly with v = μ(H / ), the co-volume of in H. We prove this for non-uniform lattices in a very strong form, showing that for 2-generic such H's, d() = OH( v / v), which is essentially optimal. While we can not prove a new upper bound for uniform lattices, we will show that for such lattices one can not expect to achieve a better bound than d() = O( v).
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