AbstractIn this note we consider certain Fitting p-groups in which every proper subgroup satisfies an outer commutator identity and obtained some conditions for such groups to be imperfect. We also give an application of the main theorem to obtain an idea of the abundance of the groups under consideration
The paper entitled "Characterizations of Fitting p-Groups whose Proper Subgroups are Solvable" (Adv....
In this paper we continue the investigation originally initiated by Hobby on the three classes of fi...
Abstract. For a given prime p, what is the smallest integer n such that there exists a group of orde...
AbstractIn this note we consider certain Fitting p-groups in which every proper subgroup satisfies a...
This work continues the study of infinitely generated groups whose proper subgroups are solvable and...
Abstract. This work is a continuation of [A. O. Asar, On innitely generated groups whose proper subg...
A set of subgroups F of a finite group G is referred to as a Fitting set if it is closed with respec...
We prove that a minimal non-soluble ($MN\mathfrak{S}$ in short) Fitting $p$-group $G$ has a proper s...
We discuss recent results in which a normal subgroup of finite index (or with finite rank of the quo...
AbstractA group is said to be imperfect if it has no non-trivial perfect quotient groups. A detailed...
AbstractThe theory of Lockett sections is transferred from Fitting classes to Fitting sets. This in ...
In this paper we extend dualpronormality to an arbitrary Fitting class, introducing the notion of F-...
This work is a continuation of [A. O. Asar, On infinitely generated groups whose proper subg...
In this work we study groups for which there is a countable set of proper subgroups with the propert...
We study permutation groups in which all normal subgroups are tran-sitive or semiregular. The motiva...
The paper entitled "Characterizations of Fitting p-Groups whose Proper Subgroups are Solvable" (Adv....
In this paper we continue the investigation originally initiated by Hobby on the three classes of fi...
Abstract. For a given prime p, what is the smallest integer n such that there exists a group of orde...
AbstractIn this note we consider certain Fitting p-groups in which every proper subgroup satisfies a...
This work continues the study of infinitely generated groups whose proper subgroups are solvable and...
Abstract. This work is a continuation of [A. O. Asar, On innitely generated groups whose proper subg...
A set of subgroups F of a finite group G is referred to as a Fitting set if it is closed with respec...
We prove that a minimal non-soluble ($MN\mathfrak{S}$ in short) Fitting $p$-group $G$ has a proper s...
We discuss recent results in which a normal subgroup of finite index (or with finite rank of the quo...
AbstractA group is said to be imperfect if it has no non-trivial perfect quotient groups. A detailed...
AbstractThe theory of Lockett sections is transferred from Fitting classes to Fitting sets. This in ...
In this paper we extend dualpronormality to an arbitrary Fitting class, introducing the notion of F-...
This work is a continuation of [A. O. Asar, On infinitely generated groups whose proper subg...
In this work we study groups for which there is a countable set of proper subgroups with the propert...
We study permutation groups in which all normal subgroups are tran-sitive or semiregular. The motiva...
The paper entitled "Characterizations of Fitting p-Groups whose Proper Subgroups are Solvable" (Adv....
In this paper we continue the investigation originally initiated by Hobby on the three classes of fi...
Abstract. For a given prime p, what is the smallest integer n such that there exists a group of orde...
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