Projective linear groups as automorphism groups of chiral polytopes

Abstract

It is already known that the automorphism group of a chiral polyhedron is never isomorphic to PSL(2,q) or PGL(2,q) for any prime power q. In this paper, we show that PSL(2,q) and PGL(2,q) are never automorphism groups of chiral polytopes of rank at least 5. Moreover, we show that PGL(2,q) is the automorphism group of at least one chiral polytope of rank 4 for every q≥5. Finally, we determine for which values of q the group PSL(2,q) is the automorphism group of a chiral polytope of rank 4, except when q=pd34 where d>1 is not a prime power, in which case the problem remains unsolved.