We study locally graded groups whose non-modular subgroups are soluble and satisfy some rank condition. In particular, in order to characterize locally graded groups whose subgroups are either modular or polycyclic, we describe (generalized) soluble groups whose non-modular subgroups are finitely generated
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
AbstractA group G is said to have finite rank r if every finitely generated subgroup of G is at most...
We study locally graded groups whose non-modular subgroups are soluble and satisfy some rank conditi...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
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...
In this paper, locally graded group satisfying the minimal condition on subgroups which are neither ...
In this paper, locally graded group satisfying the minimal condition on subgroups which are neither ...
AbstractWe study the class of locally (soluble-by-finite) groups in which all proper subgroups are s...
In this dissertation, we determine the structure of groups whose non-permutable subgroups satisfy ce...
AbstractThe authors investigate the structure of locally soluble-by-finite groups that satisfy the w...
We prove that every finitely generated soluble group that is not virtually abelian has a subgroup of...
Abstract A non-nilpotent finite group whose proper subgroups are all nilpotent (or a finite group wi...
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
AbstractA group G is said to have finite rank r if every finitely generated subgroup of G is at most...
We study locally graded groups whose non-modular subgroups are soluble and satisfy some rank conditi...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
In this paper the authors study the class of locally graded groups all of whose subgroups are permut...
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...
In this paper, locally graded group satisfying the minimal condition on subgroups which are neither ...
In this paper, locally graded group satisfying the minimal condition on subgroups which are neither ...
AbstractWe study the class of locally (soluble-by-finite) groups in which all proper subgroups are s...
In this dissertation, we determine the structure of groups whose non-permutable subgroups satisfy ce...
AbstractThe authors investigate the structure of locally soluble-by-finite groups that satisfy the w...
We prove that every finitely generated soluble group that is not virtually abelian has a subgroup of...
Abstract A non-nilpotent finite group whose proper subgroups are all nilpotent (or a finite group wi...
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
We prove that every finitely generated soluble group that is not virtuallyabelian has a subgroup of o...
AbstractA group G is said to have finite rank r if every finitely generated subgroup of G is at most...
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