The Radical 2-Subgroups of Some Sporadic Simple Groups

## 2 1 2 1 2 4 2 Ž . gam, or a F 2 -amalgam. ## 4 Let G be a nonabelian simple group satisfying the assumption of the Ž . Main Theorem. Then G satisfies the assumption of Theorem 2. If 1 or Ž . 2 occurs in Theorem 2, we can appeal to some of the existing classification theorems to identify G wi

It is very likely the monster simple group M is also a completion of the Goldschmidt G -amalgam, but we have been unable to verify this. Ž . pletes the proof of part ii . From Theorem 1.2 and Lemma 1.3 we obtain COROLLARY 1.4. The groups 3 ؒ J , 3 ؒ Suz, 3 ؒ O'N, 3 ؒ Fi , and completions of the G

A proof that the universal embedding of the involution geometry of Suz over F 2 is 143-dimensional.

This paper reports on a new and independent existence proof for the sporadic simple group Ly of Lyons, using only two permutations of degree 9 606 125, computed by Cooperman, Finkelstein, Tselman, and York. We will show that these two permutations generate a group G Ly, by first computing a base and