Joins of σ-subnormal subgroups

Abstract

Let σ=\σj\,:\, j∈ J\ be a partition of the set P of all prime numbers. A subgroup X of a finite group G is~σ-subnormal in G if there exists a chain of subgroups X=X0≤ X1≤…≤ Xn=G such that, for each 1≤ i≤ n-1, Xi-1 Xi or Xi/(Xi-1)Xi is a σji-group for some ji∈ J. Skiba~[12] studied the main properties of σ-subnormal subgroups in finite groups and showed that the set of all σ-subnormal subgroups plays a relevant role in the structure of a finite soluble group. In [5], we laid the foundation of a general theory of σ-subnormal subgroups (and σ-series) in locally finite groups. It turns out that the main difference between the finite and the locally finite case concerns the behaviour of the join of σ-subnormal subgroups: in finite groups, σ-subnormal subgroups form a sublattice of the lattice of all subgroups [3], but this is no longer true for arbitrary locally finite groups. This is similar to what happens with subnormal subgroups, so it makes sense to study the class Sσ∞ (resp. Sσ) of locally finite groups in which the join of (resp. of finitely many) σ-subnormal subgroups is σ-subnormal. Our aim is to study how much one can extend a group in one of these classes before going outside the same class (see for example Theorems~3.6, 3.8, 5.5 and 5.7). Also, σ-subnormality criteria for the join of σ-subnormal subgroups are obtained: similarly to a celebrated theorem of Williams (see [15]), we give a necessary and sufficient conditions for a join of two σ-subnormal subgroups to always be σ-subnormal; consequently, we show that the join of two orthogonal σ-subnormal subgroups is σ-subnormal (extending a result of Roseblade [11]).

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