On Diameters of Cayley Graphs over Matrix Groups
Abstract: We establish for the matrix group $G=\mathrm{SL}{n}\left(\mathbb{F}{p}\right)$ that there exist absolute constants $c\in\left(0,1\right)$ and $C>0$ such that any symmetric generating set $A$, with $\left|A\right|\geq\left|G\right|{1-c}$ has a covering number $\leq Cn{2}.$ This result is sharp up to the value of the constant $C>0$.
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