Bounding the Exponent of a Finite Group with Automorphisms

Let F be a free group of rank n. Denote by Out F its outer automorphism n n group, that is, its automorphism group modulo its inner automorphism group. For arbitrary n, by considering group actions on finite connected graphs, we derived the maximum order of finite abelian subgroups in Out F . Moreov

Let R be a commutative ring, V a finitely generated free R-module and G GL R (V) a finite group acting naturally on the graded symmetric algebra A=Sym(V). Let ;(A G ) denote the minimal number m, such that the ring A G of invariants can be generated by finitely many elements of degree at most m. Fur

The pure symmetric automorphism group of a finitely generated free group consists of those automorphisms which send each standard generator to a conjugate of itself. We prove that these groups are duality groups.

for helmut wielandt on his 90th birthday Whilst studying a certain symmetric 99 49 24 -design acted upon by a Frobenius group of order 21, it became clear that the design would be a member of an infinite series of symmetric 2q 2 + 1 q 2 q 2 -1 /2 -designs for odd prime powers q. In this note, we pre

For a finite group G, let k G denote the number of conjugacy classes of G. We prove that a simple group of Lie type of untwisted rank l over the field of q Ž . l elements has at most 6 q conjugacy classes. Using this estimate we show that for Ž . Ž . 10 n completely reducible subgroups G of GL n, q