Orbits of Z (2.O8+(2).2) in Dimension 8

Abstract

Groups of structure 2.O8+(2) have an irreducible representation of degree 8 which can be realized over Z and any prime field Fp. This representation extends to a group of structure 2.O8+(2).2. Any subgroup Z ≤ Fp× acts by scalar multiplication on this module over Fp. In this short note we determine for which primes p > 7 and which Z the central products Z (2.O8+(2) and Z (2.O8+(2).2) have a regular orbit on the 8-dimensional Fp-module. This work was triggered by an omission in the paper by K\"ohler and Pahlings with title 'Regular Orbits and the k(GV)-Problem', a paper which is used in various places in work on the k(GV)-problem.