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Character bounds for finite groups of Lie type. (arXiv:1707.03896v1 [math.GR])
来源于:arXiv
We establish new bounds on character values and character ratios for finite
groups $G$ of Lie type, which are considerably stronger than previously known
bounds, and which are best possible in many cases. These bounds have the form
$|\chi(g)| \le \chi(1)^{\alpha_g}$, and give rise to a variety of applications,
for example to covering numbers and mixing times of random walks on such
groups. In particular we deduce that, if $G$ is a classical group in dimension
$n$, then, under some conditions on $G$ and $g \in G$, the mixing time of the
random walk on $G$ with the conjugacy class of $g$ as a generating set is (up
to a small multiplicative constant) $n/s$, where $s$ is the support of $g$. 查看全文>>