Hyperbolic manifolds and tessellations of type 3,5,3 associated with L2(q)

Abstract

We classify the normal subgroups K of the tetrahedral group Delta=[3,5,3]+, the even subgroup of the Coxeter group Gamma=[3,5,3], with Delta/K isomorphic to a finite simple group L2(q). We determine their normalisers N(K) in the isometry group of hyperbolic 3-space H3, the isometry groups N(K)/K of the associated hyperbolic 3-manifolds H3/K, and the symmetry groups NGamma(K)/K of the icosahedral tessellations of these manifolds, giving a detailed analysis of how L2(q) acts on these tessellations.