Invariable generation of permutation and linear groups
Abstract
A subset \x1,x2,,xd\ of a group G invariably generates G if \x1g1,x2g2,,xdgd\ generates G for every d-tuple (g1,g2,gd)∈ Gd. We prove that a finite completely reducible linear group of dimension n can be invariably generated by 3n2 elements. We also prove tighter bounds when the field in question has order 2 or 3. Finally, we prove that a transitive [respectively primitive] permutation group of degree n≥ 2 [resp. n≥ 3] can be invariably generated by O(nn) [resp. O(nn)] elements.
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