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A characterization of countable Butler groups

L. Bican, L. Salce, J. Štěpán (1985)

Rendiconti del Seminario Matematico della Università di Padova

A characterization of Ext(G,ℤ) assuming (V = L)

Saharon Shelah, Lutz Strüngmann (2007)

Fundamenta Mathematicae

We complete the characterization of Ext(G,ℤ) for any torsion-free abelian group G assuming Gödel’s axiom of constructibility plus there is no weakly compact cardinal. In particular, we prove in (V = L) that, for a singular cardinal ν of uncountable cofinality which is less than the first weakly compact cardinal and for every sequence $(ν_{p} : p \in Π)$ of cardinals satisfying $ν_{p} \leq 2^{ν}$ (where Π is the set of all primes), there is a torsion-free abelian group G of size ν such that $ν_{p}$ equals the p-rank of Ext(G,ℤ) for every...

A closed category of reflexive topological abelian groups

Michael Barr (1977)

Cahiers de Topologie et Géométrie Différentielle Catégoriques

A Generalization of Baer's Splitting problem on Abelian groups.

L. Fuchs (1989)

Manuscripta mathematica

A homological algebra for valuated groups

Temple H. Fay (1981)

Cahiers de Topologie et Géométrie Différentielle Catégoriques

A note on coflat abelian groups

Ulrich F. Albrecht, T. Faticoni, H. Pat Goeters (1994)

Czechoslovak Mathematical Journal

A note on the countable extensions of separable $p^{ω + n}$ -projective abelian $p$ -groups

Peter Vassilev Danchev (2006)

Archivum Mathematicum

It is proved that if $G$ is a pure $p^{ω + n}$ -projective subgroup of the separable abelian $p$ -group $A$ for $n \in N \cup {0}$ such that $| A / G | \leq ℵ_{0}$ , then $A$ is $p^{ω + n}$ -projective as well. This generalizes results due to Irwin-Snabb-Cutler (CommentṀathU̇nivṠtṖauli, 1986) and the author (Arch. Math. (Brno), 2005).

$A$ -projective resolutions and an Azumaya theorem for a class of mixed abelian groups

Ulrich F. Albrecht (2001)

Czechoslovak Mathematical Journal

A remark on subgroups of infinite index in Poincaré duality groups.

R. Strebel (1977)

Commentarii mathematici Helvetici

A useful category for mixed Abelian groups.

Gălugăreanu, Grigore (1999)

Theory and Applications of Categories [electronic only]

Abelian group extensions and the axiom of constructibility.

Martin Huber, Paul C. Eklof (1979)

Commentarii mathematici Helvetici

Abelian group pairs having a trivial coGalois group

Paul Hill (2008)

Czechoslovak Mathematical Journal

Torsion-free covers are considered for objects in the category $q_{2} .$ Objects in the category $q_{2}$ are just maps in $R$ -Mod. For $R = ℤ,$ we find necessary and sufficient conditions for the coGalois group $G (A ⟶ B),$ associated to a torsion-free cover, to be trivial for an object $A ⟶ B$ in $q_{2} .$ Our results generalize those of E. Enochs and J. Rado for abelian groups.

Abelian groups which have trivial absolute coGalois group

Edgar E. Enochs, Juan Rada (2005)

Czechoslovak Mathematical Journal

In this article we characterize those abelian groups for which the coGalois group (associated to a torsion free cover) is equal to the identity.

Algebraic Classes of Abelian Torsion-Free and Lattice-Ordered Groups

Anthony W. Hager, James J. Madden (1984)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

Almost free splitters

Rüdiger Göbel, Saharon Shelah (1999)

Colloquium Mathematicae

Let R be a subring of the rationals. We want to investigate self splitting R-modules G, that is, such that $E x t_{R} (G, G) = 0$ . For simplicity we will call such modules splitters (see [10]). Also other names like stones are used (see a dictionary in Ringel’s paper [8]). Our investigation continues [5]. In [5] we answered an open problem by constructing a large class of splitters. Classical splitters are free modules and torsion-free, algebraically compact ones. In [5] we concentrated on splitters which are larger...

Almost-flat modules

Simion Breaz (2003)

Czechoslovak Mathematical Journal

We present general properties for almost-flat modules and we prove that a self-small right module is almost flat as a left module over its endomorphism ring if and only if the class of $g$ -static modules is closed under the kernels.

An addendum and corrigendum to "Almost free splitters" (Colloq. Math. 81 (1999), 193-221)

Rüdiger Göbel, Saharon Shelah (2001)

Colloquium Mathematicae

Let R be a subring of the rational numbers ℚ. We recall from [3] that an R-module G is a splitter if $E x t ¹_{R} (G, G) = 0$ . In this note we correct the statement of Main Theorem 1.5 in [3] and discuss the existence of non-free splitters of cardinality ℵ₁ under the negation of the special continuum hypothesis CH.

Characterization of the automorphisms having the lifting property in the category of Abelian $p$ -groups.

Abdelalim, S., Essannouni, H. (2003)

International Journal of Mathematics and Mathematical Sciences

Characterization of the inessential endomorphisms in the category of Abelian group.

S. Abdelalim, H. Essannouni (2003)

Publicacions Matemàtiques

An endomorphism f of an Abelian group A is said to be inessentia! (in the category of Abelian groups) if it can be extended to an endomorphism of any Abelian group which contains A as a subgroup. In this paper we show that f is as above if and only if (f - v idA)(A) is contained in the rnaximal divisible subgroup of A for some v belonging to Z.

Clones of spaces and maps in homotopy theory.

C.A. McGibbon (1993)

Commentarii mathematici Helvetici

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