On rings over which every finitely generated module is a direct sum of cyclic modules

We define prime uniserial modules as a generalization of uniserial modules. We say that an [Formula: see text]-module [Formula: see text] is prime uniserial ([Formula: see text]-uniserial) if its prime submodules are linearly ordered by inclusion, and we say that [Formula: see text] is prime serial ([Formula: see text]-serial) if it is a direct sum of [Formula: see text]-uniserial modules. The goal of this paper is to study [Formula: see text]-serial modules over commutative rings. First, we study the structure [Formula: see text]-serial modules over almost perfect domains and then we determine the structure of [Formula: see text]-serial modules over Dedekind domains. Moreover, we discuss the following natural questions: “Which rings have the property that every module is [Formula: see text]-serial?” and “Which rings have the property that every finitely generated module is [Formula: see text]-serial?”.

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Finitely generated cyclic extensions of free groups are residually finite

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700046906 ◽

1971 ◽

Vol 5 (1) ◽

pp. 87-94 ◽

Cited By ~ 12

Author(s):

Gilbert Baumslag

Keyword(s):

Free Group ◽

Principal Ideal ◽

Free Groups ◽

Cyclic Extension ◽

Principal Ideal Domain ◽

Finitely Generated ◽

Finitely Generated Module ◽

Residually Finite ◽

Ideal Domain ◽

Direct Sum

We establish the result that a finitely generated cyclic extension of a free group is residually finite. This is done, in part, by making use of the fact that a finitely generated module over a principal ideal domain is a direct sum of cyclic modules.

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Elementary operators and subhomogeneous C*-algebras

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091509001114 ◽

2010 ◽

Vol 54 (1) ◽

pp. 99-111 ◽

Cited By ~ 4

Author(s):

Ilja Gogić

Keyword(s):

Tensor Product ◽

Finite Type ◽

Finitely Generated ◽

Finitely Generated Module ◽

C Algebras ◽

Direct Sum ◽

Elementary Operators ◽

Uniformly Bounded

AbstractLet A be a C*-algebra and let ΘA be the canonical contraction form the Haagerup tensor product of M(A) with itself to the space of completely bounded maps on A. In this paper we consider the following conditions on A: (a) A is a finitely generated module over the centre of M(A); (b) the image of ΘA is equal to the set E(A) of all elementary operators on A; and (c) the lengths of elementary operators on A are uniformly bounded. We show that A satisfies (a) if and only if it is a finite direct sum of unital homogeneous C*-algebras. We also show that if a separable A satisfies (b) or (c), then A is necessarily subhomogeneous and the C*-bundles corresponding to the homogeneous subquotients of A must be of finite type.

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Decompositions of modules into projective modules and CS-modules

Bulletin of the Australian Mathematical Society ◽

10.1017/s000497270001858x ◽

2000 ◽

Vol 62 (1) ◽

pp. 159-164

Author(s):

Somyot Plubtieng

Keyword(s):

Projective Module ◽

Injective Module ◽

Projective Modules ◽

Finitely Generated ◽

Finitely Generated Module ◽

Noetherian Module ◽

Direct Sum ◽

Continuous Module

Let M be a right R-module. It is shown that M is a locally Noetherian module if every finitely generated module in σ[M] is a direct sum of a projective module and a CS-module. Moreover, if every module in σ[M] is a direct sum of a projective module and a CS-module, then every module in σ[M] is a direct sum of modules which are either indecomposable projective or uniform Σ-quasi-injective. In particular, if every module in σ[M] is a direct sum of a projective module and a quasi-continuous module, then every module in σ[M] is a direct sum of a projective module and a quasi-injective module.

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On a Class of Automaton Algebras

Proceedings of the Edinburgh Mathematical Society ◽

10.1017/s0013091516000134 ◽

2016 ◽

Vol 60 (1) ◽

pp. 31-38 ◽

Cited By ~ 1

Author(s):

Ferran Cedó ◽

Jan Okniński

Keyword(s):

Finitely Generated ◽

Finitely Generated Module ◽

Commutative Subalgebra

AbstractWe show that every finitely generated algebra that is a finitely generated module over a finitely generated commutative subalgebra is an automaton algebra in the sense of Ufnarovskii.

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Gelfand-Kirillov Dimensions of Modules over Differential Difference Algebras

Algebra Colloquium ◽

10.1142/s1005386716000596 ◽

2016 ◽

Vol 23 (04) ◽

pp. 701-720 ◽

Cited By ~ 2

Author(s):

Xiangui Zhao ◽

Yang Zhang

Keyword(s):

Computational Method ◽

Finitely Generated ◽

Finitely Generated Module ◽

Polynomial Algebras ◽

Ore Extensions ◽

Basis Method ◽

Finitely Generated Modules ◽

Kirillov Dimension

Differential difference algebras are generalizations of polynomial algebras, quantum planes, and Ore extensions of automorphism type and of derivation type. In this paper, we investigate the Gelfand-Kirillov dimension of a finitely generated module over a differential difference algebra through a computational method: Gröbner-Shirshov basis method. We develop the Gröbner-Shirshov basis theory of differential difference algebras, and of finitely generated modules over differential difference algebras, respectively. Then, via Gröbner-Shirshov bases, we give algorithms for computing the Gelfand-Kirillov dimensions of cyclic modules and finitely generated modules over differential difference algebras.

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Stable equivalence and rings whose modules are a direct sum of finitely generated modules

Journal of Pure and Applied Algebra ◽

10.1016/0022-4049(80)90032-8 ◽

1980 ◽

Vol 16 (3) ◽

pp. 265-273 ◽

Cited By ~ 5

Author(s):

Harlan L. Hullinger

Keyword(s):

Finitely Generated ◽

Direct Sum ◽

Stable Equivalence ◽

Finitely Generated Modules

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Factorizations of groups of automorphisms of a finitely generated module over a commutative ring

Ukrainian Mathematical Journal ◽

10.1007/bf01066479 ◽

1988 ◽

Vol 39 (5) ◽

pp. 551-551

Author(s):

N. S. Chernikov

Keyword(s):

Commutative Ring ◽

Finitely Generated ◽

Finitely Generated Module ◽

Groups Of Automorphisms

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A note on the fixed subring of an FPF ring

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700003543 ◽

1989 ◽

Vol 40 (1) ◽

pp. 109-111 ◽

Cited By ~ 3

Author(s):

John Clark

Keyword(s):

Finite Group ◽

Associative Ring ◽

Finitely Generated ◽

Group Of Automorphisms ◽

Direct Sum ◽

Epimorphic Image ◽

A Finite Group

An associative ring R with identity is called a left (right) FPF ring if given any finitely generated faithful left (right) R-module A and any left (right) R-module M then M is the epimorphic image of a direct sum of copies of A. Faith and Page have asked if the subring of elements fixed by a finite group of automorphisms of an FPF ring need also be FPF. Here we present examples showing the answer to be negative in general.

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