Chiral polytopes of order 2pm
Abstract
Let P be a chiral polytope with type \k1, k2\ and G=Aut(P). Suppose |G|=2pm, where k1, k2≥ 3 and p is an odd prime. Let P be a Sylow p-subgroup of G. We prove that G P Z2, d(P)=2, P' 1(so m ≥ 3) and up to duality, \k1, k2\=\pl1, 2pl2\ for some integral l1, l2 ≥ 1. Moreover, we show that P is tight (k1k2=2pm) if and only if P is metacyclic group. Furthermore, if m=3 or 4, then P must be tight, and if m ≥ 5, where either m is odd, or m is even and m ≥ p+3, there exists a non-tight chiral polytope P.
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