String C-groups of order 4pm
Abstract
Let (G,\0, 1, 2\) be a string C-group of order 4pm with type \k1, k2\ for m ≥ 2, k1, k2≥ 3 and p be an odd prime. Let P be a Sylow p-subgroup of G. We prove that G P (Z2 × Z2), d(P)=2, and up to duality, p k1, 2p k2. Moreover, we show that if P is abelian, then (G,\0, 1, 2\) is tight and hence known. In the case where P is nonabelian, we construct an infinite family of string C-group with type \p, 2p\ of order 4pm where m ≥ 3.
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