On one generalization of modular subgroups

Abstract

Let G be a finite group. If Mn < Mn-1 < … < M1 < M0=G where Mi is a maximal subgroup of Mi-1 for all i=1, … ,n, then Mn (n > 0) is an n-maximal subgroup of G. A subgroup M of G is called modular if the following conditions are held: (i) X, M Z = X, M Z for all X ≤ G, Z ≤ G such that X ≤ Z, and (ii) M, Y Z = M, Y Z for all Y ≤ G, Z ≤ G such that M ≤ Z. In this paper, we study finite groups whose n-maximal subgroups are modular.