Refined conjugate generation in sporadic groups
Abstract
Given an automorphism x of order bigger than 2 of a sporadic simple group S, we show that there are at most 3 conjugates of x required to generate a subgroup of order divisible by a fixed prime divisor r of |S|. The only exception is the case where S=Suz, x is in class 3A, r=11, and then the required number of generators is 4.
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