On abelian group actions with TNI-centralizers

Abstract

A subgroup H of a group G is said to be a TNI-subgroup if NG(H) Hg=1 for any g∈ G\, \,NG(H). Let A be an abelian group acting coprimely on the finite group G by automorphisms in such a way that CG(A)=\g∈ G : ga=g \, for all a∈ A\ is a solvable TNI-subgroup of G. We prove that G is a solvable group with Fitting length h(G) is at most h(CG(A))+(A). In particular h(G)≤ (A)+3 whenever CG(A) is nonnormal. Here, h(G) is the Fitting length of G and (A) is the number of primes dividing A counted with multiplicities.