Characters of Maximal Subgroups ofM-Groups

We show that S n has at most n 6Â11+o(1) conjugacy classes of primitive maximal subgroups. This improves an n c log 3 n bound given by Babai. We conclude that the number of conjugacy classes of maximal subgroups of S n is of the form ( 12 +o(1))n. It also follows that, for large n, S n has less than

Let G be a finite group and let M be a maximal subgroup of G. Let K/L be a chief factor of G such that L ≤ M and G = MK. We call the group M ∩ K/L a c-section of M in G. All c-sections of M are isomorphic. Using the concept of c-sections, we obtain some new characterizations of solvable and π-solvab

Let A and G be finite groups with coprime orders, and suppose that A acts on G by automorphisms. Let π G A Irr A G → Irr C G A be the Glauberman-Isaacs correspondence. Let B ≤ A and let χ ∈ Irr A G . We examine the conjecture that χπ G A is an irreducible constituent of the restriction of χπ G B to

We compute conjugacy classes in maximal parabolic subgroups of the general linear group. This computation proceeds by reducing to a "matrix problem." Such problems involve finding normal forms for matrices under a specified set of row and column operations. We solve the relevant matrix problem in sm