On Diameters of Cayley Graphs over Matrix Groups
Abstract
We establish for the matrix group G=SLn(Fp) that there exist absolute constants c∈(0,1) and C>0 such that any symmetric generating set A, with |A|≥|G|1-c has a covering number ≤ Cn2. This result is sharp up to the value of the constant C>0.
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