Bipartite q-Kneser graphs and two-generated irreducible linear groups

Abstract

Let V:=(Fq)d be a d-dimensional vector space over the field Fq of order q. Fix positive integers e1,e2 satisfying e1+e2=d. Motivated by analysing a fundamental algorithm in computational group theory for recognising classical groups, we consider a certain quantity P(e1,e2) which arises in both graph theory and group representation theory: P(e1,e2) is the proportion of 3-walks in the `bipartite q-Kneser graph' e1,e2 that are closed 3-arcs. We prove that, for a group G satisfying SLd(q)≤slant G≤slant GLd(q), the proportion of certain element-pairs in G called `(e1,e2)-stingray duos' which generate an irreducible subgroup is also equal to P(e1,e2). We give an exact formula for P(e1,e2), and prove that 1-q-1-q-2< P(e1,e2)< 1-q-1-q-2+2q-3-2q-5 for 2≤slant e2≤slant e1 and q≥slant2.These bounds have implications for the complexity analysis of the state-of-the-art algorithms to recognise classical groups, which we discuss in the final section.

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