Base sizes of imprimitive linear groups and orbits of general linear groups on spanning tuples
Abstract
For a subgroup L of the symmetric group S, we determine the minimal base size of GLd(q) L acting on Vd(q) as an imprimitive linear group. This is achieved by computing the number of orbits of GLd(q) on spanning m-tuples, which turns out to be the number of d-dimensional subspaces of Vm(q). We then use these results to prove that for certain families of subgroups L, the affine groups whose stabilisers are large subgroups of GLd(q) L satisfy a conjecture of Pyber concerning bases.
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