Generators and relations for the Lyons sporadic simple group

In recent years an increasing amount of our knowledge about finite groups, and especially the sporadic simple groups, has been obtained by computer calculations. This has many advantages over more traditional methods, especially speed and accuracy, and problems can be solved that are out of reach of

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

The McKay conjecture states that the number of irreducible complex characters of a group G that have degree prime to p is equal to the same number for the Sylow p-normalizer in G. We verify this conjecture for the 26 sporadic simple groups.

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

We show that, for the O'Nan sporadic simple group, there is no Rwpri and (IP) 2 geometry of rank 6 with a maximal parabolic subgroup isomorphic to M 11 and that there is no Rwpri and (IP) 2 geometry of rank 5 with a maximal parabolic subgroup isomorphic to J 1 . This last result permits us to show t