Expansion in perfect groups
Abstract
Let Ga be a subgroup of GLd(Q) generated by a finite symmetric set S. For an integer q, denote by Gaq the subgroup of Ga consisting of the elements that project to the unit element mod q. We prove that the Cayley graphs of Ga/Gaq with respect to the generating set S form a family of expanders when q ranges over square-free integers with large prime divisors if and only if the connected component of the Zariski-closure of Ga is perfect.
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