Dergi makalesi Açık Erişim
Nacaroglu, Yasar
<?xml version='1.0' encoding='UTF-8'?> <record xmlns="http://www.loc.gov/MARC21/slim"> <leader>00000nam##2200000uu#4500</leader> <datafield tag="909" ind1="C" ind2="4"> <subfield code="p">ADVANCES AND APPLICATIONS IN DISCRETE MATHEMATICS</subfield> <subfield code="v">19</subfield> <subfield code="n">4</subfield> <subfield code="c">409-420</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">10.17654/DM019040409</subfield> <subfield code="2">doi</subfield> </datafield> <datafield tag="245" ind1=" " ind2=" "> <subfield code="a">ON THE CORONA PRODUCT OF MONOGENIC SEMIGROUP GRAPHS</subfield> </datafield> <datafield tag="100" ind1=" " ind2=" "> <subfield code="a">Nacaroglu, Yasar</subfield> <subfield code="u">Kahramanmaras Sutcu Imam Univ, Fac Sci, Dept Math, Kahramanmaras, Turkey</subfield> </datafield> <datafield tag="909" ind1="C" ind2="O"> <subfield code="o">oai:zenodo.org:35465</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">2018-01-01</subfield> </datafield> <datafield tag="856" ind1="4" ind2=" "> <subfield code="u">https://aperta.ulakbim.gov.trrecord/35465/files/bib-a2a83ce2-76ab-4632-8f39-4ae3c9cdbc48.txt</subfield> <subfield code="z">md5:0de4ec2248f30c9dbe2b6578e1e43447</subfield> <subfield code="s">141</subfield> </datafield> <datafield tag="542" ind1=" " ind2=" "> <subfield code="l">open</subfield> </datafield> <controlfield tag="005">20210315192255.0</controlfield> <controlfield tag="001">35465</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">For each commutative ring R, we associate a simple graph F(R). A good amount of work is available on zero-divisor graphs. Our main aim is to extend this study on the special algebraic graphs to the corona product. In this paper, we will determinate some important graph parameters (diameter, radius, maximum degree, minimum degree, domination number, degree sequence, irregularity index, chromatic number and clique number) for the corona product of any two monogenic semigroup graphs.</subfield> </datafield> </record>
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