On τ-closed n-multiply σ-local formations of finite groups

Abstract

All groups under consideration are finite. Let σ =\σi i∈ I \ be some partition of the set of P, G be a group, and F be a class of groups. Then σ (G)=\σi σi π (G) \ and σ ( F)=G∈ Fσ (G). A function f of the form f:σ \formations of groups\ is called a formation σ-function. For any formation σ-function f the class LFσ(f) is defined as follows: LFσ(f)=(G is a group G=1 or G 1\ and \ G/Oσi', σi(G) ∈ f(σi) for all σi ∈ σ(G)). If for some formation σ-function f we have F=LFσ(f), then F is called σ-local, f is called a σ-local definition of F. Every formation is called 0-multiply σ-local. For n > 0, a formation F is called n-multiply σ-local provided either F=(1) or F=LFσ(f), where f(σi) is (n-1)-multiply σ-local for all σi∈ σ( F). Let τ(G) be a set of subgroups of G such that G∈ τ(G). Then τ is called a subgroup functor if for every epimorphism : A ~B and any groups H∈τ(A) and T∈τ(B) we have H∈τ(B) and T^-1∈τ(A). A class F is called τ-closed if τ(G)⊂eq F for all G∈ F. We describe some properties of τ-closed n-multiply σ-local formations, as well as we prove that the set lτσn of all τ-closed n-multiply σ-local formations forms a complete modular algebraic lattice. In addition, we proof that lτσn is σ-inductive and G-separable.