Dergi makalesi Açık Erişim
Calci, T. P.; Halicioglu, S.; Harmanci, A.
<?xml version='1.0' encoding='UTF-8'?> <record xmlns="http://www.loc.gov/MARC21/slim"> <leader>00000nam##2200000uu#4500</leader> <datafield tag="700" ind1=" " ind2=" "> <subfield code="a">Halicioglu, S.</subfield> <subfield code="u">Ankara Univ, Dept Math, TR-06100 Ankara, Turkey</subfield> </datafield> <datafield tag="700" ind1=" " ind2=" "> <subfield code="a">Harmanci, A.</subfield> <subfield code="u">Hacettepe Univ, Dept Math, Ankara, Turkey</subfield> </datafield> <datafield tag="909" ind1="C" ind2="4"> <subfield code="p">COMMUNICATIONS IN ALGEBRA</subfield> <subfield code="v">45</subfield> <subfield code="n">11</subfield> <subfield code="c">4610-4621</subfield> </datafield> <datafield tag="980" ind1=" " ind2=" "> <subfield code="a">user-tubitak-destekli-proje-yayinlari</subfield> </datafield> <datafield tag="540" ind1=" " ind2=" "> <subfield code="a">Creative Commons Attribution</subfield> <subfield code="u">http://www.opendefinition.org/licenses/cc-by</subfield> </datafield> <datafield tag="024" ind1=" " ind2=" "> <subfield code="a">10.1080/00927872.2016.1273360</subfield> <subfield code="2">doi</subfield> </datafield> <datafield tag="245" ind1=" " ind2=" "> <subfield code="a">Modules having Baer summands</subfield> </datafield> <datafield tag="100" ind1=" " ind2=" "> <subfield code="a">Calci, T. P.</subfield> <subfield code="u">Ankara Univ, Dept Math, TR-06100 Ankara, Turkey</subfield> </datafield> <datafield tag="909" ind1="C" ind2="O"> <subfield code="o">oai:zenodo.org:47145</subfield> <subfield code="p">user-tubitak-destekli-proje-yayinlari</subfield> </datafield> <datafield tag="650" ind1="1" ind2="7"> <subfield code="2">opendefinition.org</subfield> <subfield code="a">cc-by</subfield> </datafield> <datafield tag="260" ind1=" " ind2=" "> <subfield code="c">2017-01-01</subfield> </datafield> <datafield tag="856" ind1="4" ind2=" "> <subfield code="u">https://aperta.ulakbim.gov.trrecord/47145/files/bib-9df7e24c-39a8-4f25-9cfe-811b008fde51.txt</subfield> <subfield code="z">md5:121bb541c5b45d23e21aa1ed51b1fc9e</subfield> <subfield code="s">124</subfield> </datafield> <datafield tag="542" ind1=" " ind2=" "> <subfield code="l">open</subfield> </datafield> <controlfield tag="005">20210315215840.0</controlfield> <controlfield tag="001">47145</controlfield> <datafield tag="980" ind1=" " ind2=" "> <subfield code="a">publication</subfield> <subfield code="b">article</subfield> </datafield> <datafield tag="520" ind1=" " ind2=" "> <subfield code="a">Let R be an arbitrary ring with identity and M a right R-module with S= End(R)(M). Let F be a fully invariant submodule of M and I-1(F) denotes the set {m is an element of M : Im subset of F} for any subset I of S. The module M is called F-Baer if I-1(F) is a direct summand of M for every left ideal I of S. This work is devoted to the investigation of properties of F-Baer modules. We use F-Baer modules to decompose a module into two parts consists of a Baer module and a module determined by fully invariant submodule F, namely, for a module M, we show that M is F-Baer if and only if M = F circle plus N where N is a Baer module. By using F-Baer modules, we obtain some new results for Baer rings.</subfield> </datafield> </record>
Görüntülenme | 25 |
İndirme | 6 |
Veri hacmi | 744 Bytes |
Tekil görüntülenme | 23 |
Tekil indirme | 6 |