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The class of minimax groups is countably recognizable
Monatshefte für Mathematik, 2016 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
de Giovanni, Francesco, Trombetti, Marco
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Groups with minimax factor groups
Ukrainian Mathematical Journal, 1990 Let \(\mathfrak X\) be a class of groups. A group \(G\) is called just-non-\(\mathfrak X\) if it is not in the class \({\mathfrak X}\) but all its proper quotients are \(\mathfrak X\)-groups. The structure of just-non-\(\mathfrak X\) has been investigated for several group classes \(\mathfrak X\) (see for instance \textit{J. S. Wilson} [Proc.
Kurdachenko, L. A., Pylaev, V. V.
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On Noetherian Modules over Minimax Abelian Groups
Ukrainian Mathematical Journal, 2002 An Abelian group \(G\) is called minimax if it has a finite normal series each of whose factors is either cyclic or quasi-cyclic. The main result of the paper is the following: Let \(k\) be a field, let \(A\) be a minimax subgroup of the multiplicative group \(k^*\), and let \(K\) be the subring of the field \(k\) generated by the subgroup \(A\).
Тушев, А.В.
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Torsion-free Covers of Solvable Minimax Groups [PDF]
, 2015 Oberwolfach Preprints;2015 ...
Kropholler, Peter H., Lorensen, Karl
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The nonabelian tensor product of two soluble minimax groups
, 2010 In this paper we prove two results. The first is that the nonabelian tensor product of two Chernikov groups is a Chernikov group. The second is that the nonabelian tensor product of two soluble minimax groups is a soluble minimax group.
RUSSO, Francesco
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