Frobenius action on Carter subgroups

Abstract

Let G be a finite solvable group and H be a subgroup of Aut(G). Suppose that there exists an H-invariant Carter subgroup F of G such that the semidirect product FH is a Frobenius group with kernel F. We prove that the terms of the Fitting series of CG(H) are obtained as the intersection of CG(H) with the corresponding terms of the Fitting series of G, and the Fitting height of G may exceed the Fitting height of CG(H) by at most one. As a corollary it is shown that for any set of primes π, the terms of the π-series of CG(H) is obtained as the intersection of CG(H) with the corresponding terms of the π-series of G, and the π-length of G may exceed the π-length of CG(H) by at most one. They generalize the main results of Khu.