Simultaneous Constructions of the Sporadic Groups Co2 and Fi22

Abstract

In this article we give self-contained existence proofs for the sporadic simple groups Co2 and Fi22 using the second author's algorithm [10] constructing finite simple groups from irreducible subgroups of GLn(2). These two sporadic groups were originally discovered by J. Conway [4] and B. Fischer [7], respectively, by means of completely different and unrelated methods. In this article n=10 and the irreducible subgroups are the Mathieu group M22 and its automorphism group Aut(M22). We construct their five non-isomorphic extensions Ei by the two 10-dimensional non-isomorphic simple modules of M22 and by the two 10-dimensional simple modules of A22 = Aut(M22) over F=GF(2). In two cases we construct the centralizer Hi = CGi(zi) of a 2-central involution zi of Ei in any target simple group Gi. Then we prove that all the conditions of Algorithm 7.4.8 of [11] are satisfied. This allows us to construct G3 Co2 inside GL23(13) and G2 Fi22 inside GL78(13). We also calculate their character tables and presentations.