On the Generalized Fitting Height and Nonsoluble Length of the Mutually Permutable Products of Finite Groups

Abstract

The generalized Fitting height h*(G) of a finite group G is the least number h such that Fh* (G) = G, where F(0)* (G) = 1, and F(i+1)*(G) is the inverse image of the generalized Fitting subgroup F*(G/F*(i) (G)). Let p be a prime, 1=G0≤ G1≤…≤ G2h+1=G be the shortest normal series in which for i odd the factor Gi+1/Gi is p-soluble (possibly trivial), and for i even the factor Gi+1/Gi is a (non-empty) direct product of nonabelian simple groups. Then h=λp(G) is called the non-p-soluble length of a group G. We proved that if a finite group G is a mutually permutable product of of subgroups A and B then \h*(A), h*(B)\≤ h*(G)≤ \h*(A), h*(B)\+1 and \λp(A), λp(B)\= λp(G). Also we introduced and studied the non-Frattini length.