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Dolinar, Grecor; Kuzma, Bojan; Marovt, Janko; Ungor, Burgu
<?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">Kuzma, Bojan</subfield> </datafield> <datafield tag="700" ind1=" " ind2=" "> <subfield code="a">Marovt, Janko</subfield> </datafield> <datafield tag="700" ind1=" " ind2=" "> <subfield code="a">Ungor, Burgu</subfield> <subfield code="u">Ankara Univ, Fac Sci, Dept Math, TR-06100 Ankara, Turkey</subfield> </datafield> <datafield tag="909" ind1="C" ind2="4"> <subfield code="p">GLASNIK MATEMATICKI</subfield> <subfield code="v">55</subfield> <subfield code="n">2</subfield> <subfield code="c">177-190</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="773" ind1=" " ind2=" "> <subfield code="i">isVersionOf</subfield> <subfield code="a">10.81043/aperta.9382</subfield> <subfield code="n">doi</subfield> </datafield> <datafield tag="024" ind1=" " ind2=" "> <subfield code="a">10.81043/aperta.9383</subfield> <subfield code="2">doi</subfield> </datafield> <datafield tag="245" ind1=" " ind2=" "> <subfield code="a">ON SOME PARTIAL ORDERS ON A CERTAIN SUBSET OF THE POWER SET OF RINGS</subfield> </datafield> <datafield tag="100" ind1=" " ind2=" "> <subfield code="a">Dolinar, Grecor</subfield> </datafield> <datafield tag="909" ind1="C" ind2="O"> <subfield code="o">oai:zenodo.org:9383</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">2020-01-01</subfield> </datafield> <datafield tag="856" ind1="4" ind2=" "> <subfield code="u">https://aperta.ulakbim.gov.trrecord/9383/files/bib-43f590e8-372f-4599-b382-f2c6f4000311.txt</subfield> <subfield code="z">md5:245353f267b1c2310632f2874404970c</subfield> <subfield code="s">161</subfield> </datafield> <datafield tag="542" ind1=" " ind2=" "> <subfield code="l">open</subfield> </datafield> <controlfield tag="005">20210315071238.0</controlfield> <controlfield tag="001">9383</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 a ring with identity and let J(R) be a collection of subsets of R. such that their left and right annihilators are generated by the same idempotent. We extend the notion of the sharp, the left-sharp, and the right-sharp partial orders to J(R), present equivalent definitions of these orders, and study their properties. We also extend the concept of the core and the dual core orders to J(R), show that they are indeed partial orders when R. is a Baer *-ring, and connect them with one-sided sharp and star partial orders.</subfield> </datafield> </record>
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