Finite groups of rank two which do not involve Qd(p)
Abstract
Let p>3 be a prime. We show that if G is a finite group with p-rank equal to 2, then G involves Qd(p) if and only if G p'-involves Qd(p). This allows us to use a version of Glauberman's ZJ-theorem to give a more direct construction of finite group actions on mod-p homotopy spheres. We give an example to illustrate that the above conclusion does not hold for p ≤ 3.
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