Partial Decomposition Bases and Global Warfield Groups

Jacoby, Carol; Loth, Peter

doi:10.1080/00927872.2015.1085547

Communications in Algebra

2016

DOI: 10.1080/00927872.2015.1085547

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Partial Decomposition Bases and Global Warfield Groups

Carol Jacoby¹,

Peter Loth

Abstract: The class of abelian groups with partial decomposition bases was developed by the first author in order to generalize Barwise and Eklof's classification of torsion groups in L . In this article, we continue to explore algebraic characteristics of this class and establish a uniqueness theorem, extending our previous work on mixed p-local groups to the global case. It is shown that groups with partial decomposition bases are characterized in terms of Warfield groups and k-groups of Hill and Megibben. In fact, we… Show more

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Cited by 2 publications

References 14 publications

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The classification of $${\mathbb {Z}}_p$$ Z p -modules with partial decomposition bases in $$L_{\infty \omega }$$ L ∞ ω

Jacoby¹,

Loth

2016

Arch. Math. Logic

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Ulm's Theorem presents invariants that classify countable abelian torsion groups up to isomorphism. Barwise and Eklof extended this result to the classification of arbitrary abelian torsion groups up to L∞ω-equivalence. In this paper, we extend this classification to a class of mixed Zp-modules which includes all Warfield modules and is closed under L∞ω-equivalence. The defining property of these modules is the existence of what we call a partial decomposition basis, a generalization of the concept of decomposition basis. We prove a complete classification theorem in L∞ω using invariants deduced from the classical Ulm and Warfield invariants.

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The classification of $${\mathbb {Z}}_p$$ Z p -modules with partial decomposition bases in $$L_{\infty \omega }$$ L ∞ ω

Jacoby¹,

Loth

2016

Arch. Math. Logic

Self Cite

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The classification of infinite abelian groups with partial decomposition bases in $L_\infty \omega $

Jacoby¹,

Loth²

2017

Rocky Mountain J. Math.

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We consider abelian groups with partial decomposition bases in L δ ∞ω for ordinals δ. Jacoby, Leistner, Loth and Strüngmann developed a numerical invariant deduced from the classical global Warfield invariant and proved that if two groups have identical modified Warfield invariants and Ulm-Kaplansky invariants up to ωδ for some ordinal δ, then they are equivalent in L δ ∞ω. Here we prove that the modified Warfield invariant is expressible in L δ ∞ω and hence the converse is true for appropriate δ.

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Partial Decomposition Bases and Global Warfield Groups

Cited by 2 publications

References 14 publications

The classification of $${\mathbb {Z}}_p$$ Z p -modules with partial decomposition bases in $$L_{\infty \omega }$$ L ∞ ω

The classification of $${\mathbb {Z}}_p$$ Z p -modules with partial decomposition bases in $$L_{\infty \omega }$$ L ∞ ω

The classification of infinite abelian groups with partial decomposition bases in $L_\infty \omega $

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