A class X of groups is said to be countably recognizable if a group belongs to X whenever all its countable subgroups lie in X. It is proved here that the class of minimax groups is countably recognizable
AbstractIn this paper we prove some results concerning how much information about the structure of a...
A result of Dixon, Evans and Smith shows that if $G$ is a locally (soluble-by-finite) group whose pr...
A group G is said to be cohopfian if it is neither trivial nor isomorphic to any of its proper subgr...
A class X of groups is said to be countably recognizable if a group belongs to X whenever all its co...
A group class ${ X}$ is said to be countably recognizable if a group belongs to ${X}$ whenever all i...
AbstractIt is proved that certain classes of groups that are either (locally soluble)-by-finite rank...
Countably recognizable group classes were introduced by Reinhold Baer and provide a very ingenious w...
Countably recognizable group classes were introduced by Reinhold Baer and provide a very ingenious w...
The aim of this paper is to develop a general construction method of finite series of a group G base...
We describe soluble groups in which the set of all subgroups is countable and show that locally (sol...
The aim of this paper is to develop a general construction method of finite series of a group G base...
We prove that every finitely generated, virtually solvable minimax group can be expressed as a homom...
AbstractWe define a relative property A for a countable group with respect to a finite family of sub...
An abelian group G is called minimax if it contains a finitely generated subgroup H such that G/H sa...
A classical result of Neumann characterizes the groups in which each subgroup has finitely many conj...
AbstractIn this paper we prove some results concerning how much information about the structure of a...
A result of Dixon, Evans and Smith shows that if $G$ is a locally (soluble-by-finite) group whose pr...
A group G is said to be cohopfian if it is neither trivial nor isomorphic to any of its proper subgr...
A class X of groups is said to be countably recognizable if a group belongs to X whenever all its co...
A group class ${ X}$ is said to be countably recognizable if a group belongs to ${X}$ whenever all i...
AbstractIt is proved that certain classes of groups that are either (locally soluble)-by-finite rank...
Countably recognizable group classes were introduced by Reinhold Baer and provide a very ingenious w...
Countably recognizable group classes were introduced by Reinhold Baer and provide a very ingenious w...
The aim of this paper is to develop a general construction method of finite series of a group G base...
We describe soluble groups in which the set of all subgroups is countable and show that locally (sol...
The aim of this paper is to develop a general construction method of finite series of a group G base...
We prove that every finitely generated, virtually solvable minimax group can be expressed as a homom...
AbstractWe define a relative property A for a countable group with respect to a finite family of sub...
An abelian group G is called minimax if it contains a finitely generated subgroup H such that G/H sa...
A classical result of Neumann characterizes the groups in which each subgroup has finitely many conj...
AbstractIn this paper we prove some results concerning how much information about the structure of a...
A result of Dixon, Evans and Smith shows that if $G$ is a locally (soluble-by-finite) group whose pr...
A group G is said to be cohopfian if it is neither trivial nor isomorphic to any of its proper subgr...
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