Bases of quasisimple linear groups
Abstract
Let V be a vector space of dimension d over Fq, a finite field of q elements, and let G GL(V) GLd(q) be a linear group. A base of G is a set of vectors whose pointwise stabiliser in G is trivial. We prove that if G is a quasisimple group (i.e. G is perfect and G/Z(G) is simple) acting irreducibly on V, then excluding two natural families, G has a base of size at most 6. The two families consist of alternating groups Altm acting on the natural module of dimension d = m-1 or m-2, and classical groups with natural module of dimension d over subfields of Fq.
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