Super approximation for SL2× SL2 and ASL2
Abstract
Let S⊂ SL2( Z)× SL2( Z) or SL2( Z) Z2 be finite symmetric and assume S generates a group G which is a Zariski-dense subgroup SL2( Z)× SL2( Z) or SL2( Z) Z2. We prove that the Cayley graphs \ Cay(G(mod q), S (mod q))\q∈ Z form a family of expanders.
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