Rings and Categories of Modules

@inproceedings{Anderson1974RingsAC,
  title={Rings and Categories of Modules},
  author={Frank W. Anderson and Kent R. Fuller},
  year={1974}
}
This book is intended to provide a self-contained account of much of the theory of rings and modules. The theme of the text throughout is the relationship between the one-sided ideal structure a ring may possess and the behavior of its categories of modules. Following a brief outline of the foundations, the book begins with the basic definitions and properties of rings, modules and homomorphisms. The remainder of the text gives comprehensive treatments of direct sums, finiteness conditions, the… 
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2,906 Citations
Highly Influential Citations
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Background Citations
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Methods Citations
139
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2,906 Citations

Foundations of module and ring theory

This volume provides a comprehensive introduction to module theory and the related part of ring theory, including original results as well as the most recent work. It is a useful and stimulating

Hereditary Noetherian Prime Rings and Idealizers

The direct sum behaviour of its projective modules is a fundamental property of any ring. Hereditary Noetherian prime rings are perhaps the only noncommutative Noetherian rings for which this direct

On the cohomology of ring extensions

A decomposition theorem for ℘∗-semisimple rings

Topics in torsion theory

The purpose of this thesis is to generalize to the torsion-theoretic setting various concepts and results from the theory of rings and modules. In order to accomplish this we begin with some

DIMENSION OF CERTAIN CLEFT BINOMIAL RINGS

Let R be an artinian ring with identity. Denote by J = J(R) the Jacobson radical of R. The ring R is cleft if there is a subring S ⊆ R such that R = S J as abelian groups and S ∼ = R/J as rings.

On (semi)regularity and the total of rings and modules

Direct sum decompositions of modules, semilocal endomorphism rings, and Krull monoids☆

Semi-local localizations of rings and subdirect decompositions of modules

DUALIZING MODULES AND n-PERFECT RINGS

Abstract In this article we extend the results about Gorenstein modules and Foxby duality to a non-commutative setting. This is done in §3 of the paper, where we characterize the Auslander and Bass
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Rings of Quotients

Critères de platitude et de projectivité