Four infinite families of chiral 3-polytopes of type \4, 8\ with solvable automorphism groups

Abstract

We construct four infinite families of chiral 3-polytopes of type \4, 8\, with 1024m4, 2048m4, 4096m4 and 8192m4 automorphisms for every positive integer m, respectively. The automorphism groups of these polytopes are solvable groups, and when m is a power of 2, they provide examples with automorphism groups of order 2n where n ≥ 10. (On the other hand, no chiral polytopes of type \4, 8\ exist for n ≤ 9.) In particular, our families give a partial answer to a problem proposed by Schulte and Weiss in [Problems on polytopes, their groups, and realizations, Period. Math. Hungar. 53 (2006), 231-255] and a problem proposed by Pellicer in [Developments and open problems on chiral polytopes, Ars Math. Contemp 5 (2012), 333-354].