AbstractThe authors discuss the class Sd(r) of groups in which every finitely generated subgroup is either at most r-generated or soluble of derived length at most d. Such groups need not be of finite rank or soluble of derived length at most d in general. A structure theorem is obtained for locally finite, and for certain locally nilpotent, Sd(r)-groups
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
In this paper, we consider locally graded groups in which every non-permutable subgroup is soluble o...
AbstractIt is shown that a countable locally nilpotent group G that is also soluble has a residually...
AbstractThe authors discuss the class Sd(r) of groups in which every finitely generated subgroup is ...
AbstractA group G is said to have finite rank r if every finitely generated subgroup of G is at most...
AbstractWe study the class of locally (soluble-by-finite) groups in which all proper subgroups are s...
AbstractIt is proved that certain classes of groups that are either (locally soluble)-by-finite rank...
A well-known result due to B. H. Neumann states that a group G in which every element has at most n ...
AbstractLet D be a division ring of finite degree d and let n be a positive integer. If G is any sol...
In this dissertation, we determine the structure of groups whose non-permutable subgroups satisfy ce...
We study locally graded groups whose non-modular subgroups are soluble and satisfy some rank conditi...
For a finite group G we investigate the difference between the maximum size MaxDim (G) of an \u201ci...
AbstractLet F be a field and G a finite extension of a torsion-free soluble group of finite rank suc...
A subgroup H of a group G is called inert if [H : H \ Hg] is finite for all g 2 G. A group is called...
We study the structure of groups of finite (Prufer) rank in a very wide class of groups and also of ...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
In this paper, we consider locally graded groups in which every non-permutable subgroup is soluble o...
AbstractIt is shown that a countable locally nilpotent group G that is also soluble has a residually...
AbstractThe authors discuss the class Sd(r) of groups in which every finitely generated subgroup is ...
AbstractA group G is said to have finite rank r if every finitely generated subgroup of G is at most...
AbstractWe study the class of locally (soluble-by-finite) groups in which all proper subgroups are s...
AbstractIt is proved that certain classes of groups that are either (locally soluble)-by-finite rank...
A well-known result due to B. H. Neumann states that a group G in which every element has at most n ...
AbstractLet D be a division ring of finite degree d and let n be a positive integer. If G is any sol...
In this dissertation, we determine the structure of groups whose non-permutable subgroups satisfy ce...
We study locally graded groups whose non-modular subgroups are soluble and satisfy some rank conditi...
For a finite group G we investigate the difference between the maximum size MaxDim (G) of an \u201ci...
AbstractLet F be a field and G a finite extension of a torsion-free soluble group of finite rank suc...
A subgroup H of a group G is called inert if [H : H \ Hg] is finite for all g 2 G. A group is called...
We study the structure of groups of finite (Prufer) rank in a very wide class of groups and also of ...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
In this paper, we consider locally graded groups in which every non-permutable subgroup is soluble o...
AbstractIt is shown that a countable locally nilpotent group G that is also soluble has a residually...
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