2002
DOI: 10.1515/jgth.2002.010
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Black-box recognition of finite simple groups of Lie type by statistics of element orders

Abstract: Given a black-box group G isomorphic to some finite simple group of Lie type and the characteristic of G, we compute the standard name of G by a Monte Carlo algorithm. The running time is polynomial in the input length and in the time requirement for the group operations in G.The algorithm chooses a relatively small number of (nearly) uniformly distributed random elements of G, and examines the divisibility of the orders of these elements by certain primitive prime divisors. We show that the divisibility stati… Show more

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Cited by 28 publications
(36 citation statements)
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“…The critical case is when H is a group of Lie type, with natural characteristic p. We may use the (non-constructive) polynomial-time Monte Carlo algorithm of Babai et al [1] to name the group. Given an oracle that recognises PSL(2, q) explicitly, the algorithms of Brooksbank & Kantor [6] construct Chevalley generating sets for the linear and symplectic groups in time polynomial in the size of the input.…”
Section: Deciding Isomorphismmentioning
confidence: 99%
“…The critical case is when H is a group of Lie type, with natural characteristic p. We may use the (non-constructive) polynomial-time Monte Carlo algorithm of Babai et al [1] to name the group. Given an oracle that recognises PSL(2, q) explicitly, the algorithms of Brooksbank & Kantor [6] construct Chevalley generating sets for the linear and symplectic groups in time polynomial in the size of the input.…”
Section: Deciding Isomorphismmentioning
confidence: 99%
“…The main result of [BaB] is a polynomial-time algorithm to find a black-box representation of characteristic p for all non-abelian composition factors of a black-box group of characteristic p. Combining this with recent results on the statistical recognition of finite simple groups ( [AltB], [KS2], [BaKPS]), we are now able to name the nonabelian composition factors: Theorem 1.1 ( [BaB,AltB,KS2,BaKPS]). Given a black-box group G of known characteristic, the standard names of all nonabelian composition factors of G can be computed in Monte Carlo polynomial time.…”
Section: Nonabelian Composition Factorsmentioning
confidence: 87%
“…Babai et al [8] An implementation developed by Malle and O'Brien is distributed with GAP and Magma. It includes naming procedures for the other quasisimple groups: if the non-abelian composition factor is alternating or sporadic, then we identify it by considering the orders of random elements.…”
Section: Black-box Groups Of Lie Typementioning
confidence: 99%