An extension of the classification of high rank regular polytopes

Abstract

Up to isomorphism and duality, there are exactly two non-degenerate abstract regular polytopes of rank greater than n-3, one of rank n-1 and one of rank n-2, with automorphism groups that are transitive permutation groups of degree n≥ 7. In this paper we extend this classification of high rank regular polytopes to include the ranks n-3 and n-4. The result is, up to a isomorphism and duality, seven abstract regular polytopes of rank n-3 for each n≥ 9, and nine abstract regular polytopes of rank n-4 for each n ≥ 11. Moreover we show that if a transitive permutation group of degree n ≥ 11 is the automorphism group of an abstract regular polytope of rank at least n-4, then Sn.