THE PROPER CLASS GENERATED BY WEAK SUPPLEMENTS
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Date
2014
Authors
Rafail Alizade
Yilmaz M. Demirci
Yilmaz Durgun
Dilek Pusat
Journal Title
Journal ISSN
Volume Title
Publisher
TAYLOR & FRANCIS INC
Open Access Color
BRONZE
Green Open Access
Yes
OpenAIRE Downloads
9
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7
Publicly Funded
No
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Average
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Average
Abstract
We show that for hereditary rings the smallest proper classes containing respectively the classes of short exact sequences determined by small submodules submodules that have supplements and weak supplement submodules coincide. Moreover we show that this class can be obtained as a natural extension of the class determined by small submodules. We also study injective projective coinjective and coprojective objects of this class. We prove that it is coinjectively generated and its global dimension is at most 1. Finally we describe this class for Dedekind domains in terms of supplement submodules.
Description
Keywords
Coatomic modules, Coatomic supplement submodule, Coinjective modules, Coprojective modules, Extended weak supplement, Proper class of short exact sequences, Weak supplement submodule, Primary 18G25, Secondary 13C60, 16D90, MODULES, Coatomic Supplement Submodule, Proper Class of Short Exact Sequences, Weak Supplement Submodule, Coprojective Modules, Primary 18G25, 16D90, Coinjective Modules, Secondary 13C60, Extended Weak Supplement, Coatomic Modules, Coatomic supplement submodule, Coinjective modules, Weak supplement submodule, Extended weak supplement, Coatomic modules
Fields of Science
0101 mathematics, 01 natural sciences
Citation
WoS Q
Scopus Q
OpenCitations Citation Count
3
Source
Communications in Algebra
Volume
42
Issue
1
Start Page
56
End Page
72
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Citations
CrossRef : 1
Scopus : 7
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