Squares of conjugacy classes and a variant on the Baer-Suzuki Theorem
Abstract
For p a prime, G a finite group and A a normal subset of elements of order p, we prove that if A2 = \ab a, b ∈ A\ consists of p-elements then Q = A is soluble. Further, if Op(G) = 1, we show that p is odd, F(Q) is a non-trivial p'-group and Q/F(Q) is an elementary abelian p-group. We also provide examples which show this conclusion is best possible.
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