Babai's conjecture for high-rank classical groups with random generators
Abstract
Let G = SCln(q) be a quasisimple classical group with n large, and let x1, …, xk ∈ G random, where k ≥ qC. We show that the diameter of the resulting Cayley graph is bounded by q2 nO(1) with probability 1 - o(1). In the particular case G = SLn(p) with p a prime of bounded size, we show that the same holds for k = 3.
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