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Currently displaying 1 – 11 of 11

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On the Decomposition of Certain Infinite Nilpotent Groups.

Paul Hill — 1970

Mathematische Zeitschrift

The Balance of Tor.

Paul Hill — 1983

Mathematische Zeitschrift

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.

Almost coproducts of finite cyclic groups

Paul Hill — 1995

Commentationes Mathematicae Universitatis Carolinae

A new class of $p$ -primary abelian groups that are Hausdorff in the $p$ -adic topology and that generalize direct sums of cyclic groups are studied. We call this new class of groups almost coproducts of cyclic groups. These groups are defined in terms of a modified axiom 3 system, and it is observed that such groups appear naturally. For example, $V (G) / G$ is almost a coproduct of finite cyclic groups whenever $G$ is a Hausdorff $p$ -primary group and $V (G)$ is the group of normalized units of the modular group algebra...

On the Theory and Classification of Abelian p-Groups.

Paul Hill; Charles Megibben — 1985

Mathematische Zeitschrift

Uniqueness theorems for global mixed groups.

Paul Hill; Charles Megibben — 1994

Forum mathematicum

Butler groups cannot be classified by certain invariants

Paul Hill; Charles Megibben — 1993

Rendiconti del Seminario Matematico della Università di Padova

Almost totally projective groups

Paul Hill; William Ullery — 1996

Czechoslovak Mathematical Journal

The nonseparability of simply presented mixed groups

Paul Hill; Charles K. Megibben — 1998

Commentationes Mathematicae Universitatis Carolinae

It is demonstrated that an isotype subgroup of a simply presented abelian group can be simply presented without being a separable subgroup. In particular, the conjecture based on a variety of special cases that Warfield groups are absolutely separable is disproved.