Two infinite families of chiral polytopes of type \4,4,4\ with solvable automorphism groups

Abstract

We construct two infinite families of locally toroidal chiral polytopes of type \4,4,4\, with 1024m2 and 2048m2 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 can be any integer greater than 9. (On the other hand, no chiral polytopes of type [4,4,4] exist for n ≤ 9.) In particular, our two families give a partial answer to a problem proposed by Schulte and Weiss in [Problems on polytopes, their groups, and realizations, Periodica Math.\ Hungarica\ 53 (2006), 231-255].