Finite non-solvable groups with a maximal subgroupA satisfying the following condition are classified: A contains a nilpotent subgroupH of even order and of index¦ A : H ¦ ⩽ 2. This result is applied to the investigation of factorizable groups
AbstractFor an odd prime p, we classify finite p-groups with a unique minimal non-abelian subgroup o...
For a finite group G and an arbitrary prime p, let Sp (G) denote the intersection of all maximal sub...
We answer a question due to Babai and Goodman by showing that for each natural number n there exists...
The Theorem 12 in [A note on $p$-nilpotence and solvability of finite groups, J. Algebra 321...
Suppose that G and A are finite groups such that A acts coprimely on G via automorphisms. It is inte...
Thompson's theorem indicates that a finite group with a nilpotent maximal subgroup of odd order...
We describe (generalized) soluble-by-finite groups in which the set of non-normal subgroups which ar...
In this thesis finite groups whose maximal subgroups are of prime or prime square index are studied...
Finite solvable groups have been considered in the paper. As a result the structure of finite solvab...
AbstractIt is known that a (generalized) soluble group whose proper subgroups are abelian is either ...
AbstractIn Theorem 2.1 we characterize finite p-groups G such that each nonabelian subgroup H of G w...
ABSTRACT: In this paper we continue the study of finite p'-nilpotent groups that was started in...
summary:Counting subgroups of finite groups is one of the most important topics in finite group theo...
We consider the problem of classifying those groups whose maximal cyclic subgroups are maximal. We g...
AbstractA group G is said to satisfy max-∞ if each nonempty set of infinite subgroups of G has a max...
AbstractFor an odd prime p, we classify finite p-groups with a unique minimal non-abelian subgroup o...
For a finite group G and an arbitrary prime p, let Sp (G) denote the intersection of all maximal sub...
We answer a question due to Babai and Goodman by showing that for each natural number n there exists...
The Theorem 12 in [A note on $p$-nilpotence and solvability of finite groups, J. Algebra 321...
Suppose that G and A are finite groups such that A acts coprimely on G via automorphisms. It is inte...
Thompson's theorem indicates that a finite group with a nilpotent maximal subgroup of odd order...
We describe (generalized) soluble-by-finite groups in which the set of non-normal subgroups which ar...
In this thesis finite groups whose maximal subgroups are of prime or prime square index are studied...
Finite solvable groups have been considered in the paper. As a result the structure of finite solvab...
AbstractIt is known that a (generalized) soluble group whose proper subgroups are abelian is either ...
AbstractIn Theorem 2.1 we characterize finite p-groups G such that each nonabelian subgroup H of G w...
ABSTRACT: In this paper we continue the study of finite p'-nilpotent groups that was started in...
summary:Counting subgroups of finite groups is one of the most important topics in finite group theo...
We consider the problem of classifying those groups whose maximal cyclic subgroups are maximal. We g...
AbstractA group G is said to satisfy max-∞ if each nonempty set of infinite subgroups of G has a max...
AbstractFor an odd prime p, we classify finite p-groups with a unique minimal non-abelian subgroup o...
For a finite group G and an arbitrary prime p, let Sp (G) denote the intersection of all maximal sub...
We answer a question due to Babai and Goodman by showing that for each natural number n there exists...
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