On invertible and dense submodules

Mustafa Alkan; Yücel Tiraş

doi:10.1081/AGB-200027783

On invertible and dense submodules

Mustafa Alkan
, Yücel Tiraş

Division of Algebra and Number Theory

Hacettepe University

Research output: Contribution to journal › Article › peer-review

10 Citations (Scopus)

Abstract

In this paper, the authors give a partial characterization of invertible, dense and projective submodules. In the final section, they give the equivalent conditions to be invertible, dense and projective submodules for a given an R-module M. They also provide conditions under which a given ring R is a Dedekind domain if and only if every non zero submodule of an R-module is locally free.

Original language	English
Pages (from-to)	3911-3919
Number of pages	9
Journal	Communications in Algebra
Volume	32
Issue number	10
DOIs	https://doi.org/10.1081/AGB-200027783
Publication status	Published - 2004

Keywords

Dedekind domain
Dense submodules
Invertible submodules
Locally free submodules
Projective submodules

Access to Document

10.1081/AGB-200027783

Cite this

@article{41b3803762ca48c3b8d85e1cfe4a15ed,

title = "On invertible and dense submodules",

abstract = "In this paper, the authors give a partial characterization of invertible, dense and projective submodules. In the final section, they give the equivalent conditions to be invertible, dense and projective submodules for a given an R-module M. They also provide conditions under which a given ring R is a Dedekind domain if and only if every non zero submodule of an R-module is locally free.",

keywords = "Dedekind domain, Dense submodules, Invertible submodules, Locally free submodules, Projective submodules",

author = "Mustafa Alkan and Y{\"u}cel Tira{\c s}",

year = "2004",

doi = "10.1081/AGB-200027783",

language = "English",

volume = "32",

pages = "3911--3919",

journal = "Communications in Algebra",

issn = "0092-7872",

publisher = "Taylor and Francis Ltd.",

number = "10",

}

TY - JOUR

T1 - On invertible and dense submodules

AU - Alkan, Mustafa

AU - Tiraş, Yücel

PY - 2004

Y1 - 2004

N2 - In this paper, the authors give a partial characterization of invertible, dense and projective submodules. In the final section, they give the equivalent conditions to be invertible, dense and projective submodules for a given an R-module M. They also provide conditions under which a given ring R is a Dedekind domain if and only if every non zero submodule of an R-module is locally free.

AB - In this paper, the authors give a partial characterization of invertible, dense and projective submodules. In the final section, they give the equivalent conditions to be invertible, dense and projective submodules for a given an R-module M. They also provide conditions under which a given ring R is a Dedekind domain if and only if every non zero submodule of an R-module is locally free.

KW - Dedekind domain

KW - Dense submodules

KW - Invertible submodules

KW - Locally free submodules

KW - Projective submodules

UR - https://www.scopus.com/pages/publications/22744433831

U2 - 10.1081/AGB-200027783

DO - 10.1081/AGB-200027783

M3 - Article

AN - SCOPUS:22744433831

SN - 0092-7872

VL - 32

SP - 3911

EP - 3919

JO - Communications in Algebra

JF - Communications in Algebra

IS - 10

ER -

On invertible and dense submodules

Abstract

Keywords

Access to Document

Other files and links

Fingerprint

Cite this