The probability that two elements with large 1-eigenspaces generate a classical group
Abstract
With high probability, among O( n) independent randomly selected elements from a finite n-dimensional classical group, some pair of elements power to a 2-element generating set for a naturally embedded classical subgroup of dimension O( n). The 2-element generating set produced consists of certain elements with large 1-eigenspaces, called stingray elements. Underpinning this result is a new theorem on the generation of a finite classical group by a pair of stingray elements. In particular we show that, for classical groups not containing SLn(q), the probability of generation is at least 0.975. The explicit probability bounds we obtain will be applied to justify complexity analyses for new constructive recognition algorithms for finite classical groups.
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