Prescribing Symmetries and Automorphisms for Polytopes

Abstract

We study finite groups that occur as combinatorial automorphism groups or geometric symmetry groups of convex polytopes. When is a subgroup of the combinatorial automorphism group of a convex d-polytope, d≥ 3, then there exists a convex d-polytope related to the original polytope with combinatorial automorphism group exactly . When is a subgroup of the geometric symmetry group of a convex d-polytope, d≥ 3, then there exists a convex d-polytope related to the original polytope with both geometric symmetry group and combinatorial automorphism group exactly . These symmetry-breaking results then are applied to show that for every abelian group of even order and every involution σ of , there is a centrally symmetric convex polytope with geometric symmetry group such that σ corresponds to the central symmetry.