Results 151 to 160 of about 509 (172)
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Finite Rank Torsion Free Abelian Groups and Rings
Lecture Notes in Mathematics, 1982David M Arnold
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The automorphism group of the semigroup of finite complexes of a rank one torsion free abelian group
Archiv Der Mathematik, 1982Byrd, Richard D. +2 more
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Torsion-Free Abelian Groups of Finite Rank with Marked Bases
Journal of Mathematical Sciences, 2021zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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FINITE AUTOMORPHISM GROUPS OF TORSION-FREE ABELIAN GROUPS OF FINITE RANK
Mathematics of the USSR-Izvestiya, 1989A well-known result of Jónsson states that each torsion-free group G of finite rank has a quasi-direct decomposition i.e. a subgroup A of finite index which is a direct sum of pure strongly indecomposable subgroups. For such a group several quasi-direct decompositions do exist all being quasi-isomorphic but generally not isomorphic.
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Self-Cancellation of Torsion-Free Abelian Groups of Finite Rank
Journal of Mathematical Sciences, 2002An Abelian group \(A\) is said to have self-cancellation if \(A\oplus A\cong A\oplus B\) implies \(A\cong B\). A very simple example of a rank 4 torsion-free Abelian group without the self-cancellation property is constructed. The construction is based on the author's criterion [Algebra Anal. 7, No. 6, 33-78 (1995); corrections ibid. 11, No. 4, 222-224
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On the Complexity of the Classification Problem for Torsion-Free Abelian Groups of Finite Rank
Bulletin of Symbolic Logic, 2001In this paper, we shall discuss some recent contributions to the project [15, 14, 2, 18, 22, 23] of explaining why no satisfactory system of complete invariants has yet been found for the torsion-free abelian groups of finite rank n ≥ 2. Recall that, up to isomorphism, the torsion-free abelian groups of rank n are exactly the additive subgroups of the ...
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On the torsion-free ranks of finitely generated nilpotent groups and of their abelian subgroups
Journal of Group Theory, 2004Denote by \(f(n)\) the greatest integer \(h\) such that there exists a finitely generated nilpotent group of torsion-free rank \(h\) such that the torsion-free ranks of all Abelian subgroups of this group are not greater than \(n\). The author proves that the function \(f(n)\) satisfies the inequality \(f(n)\geq\tfrac18(n^2-4)+n\). Proving this theorem,
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Direct decompositions of torsion-free homogeneous Abelian groups of finite rank
Lithuanian Mathematical Journal, 1992zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Categories of Mixed and Torsion-Free Finite Rank Abelian Groups
1995In this paper “group” always means “abelian group”. For a group G let T = T(G) be the torsion part and, for a prime p, let T p = T p (G), be the p-torsion part of G.
Alexander A. Fomin, William J. Wickless
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TORSION-FREE ABELIAN GROUPS WITH FINITE RANK ENDOMORPHISM RINGS
Quaestiones Mathematicae, 1991Abstract We show that if A and C are torsion-free abelian groups with ∩{ker f|f: A → C} = 0 = ∩{ker g|g: C → A}, and if A has a left Artinian quasi-endomorphism ring then A and C share a nonzero quasi-summand. Some consequences explored.
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