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<creators>
<creator>
<creatorName>Arnautov, V.I.</creatorName>
<affiliation>Institutul de Matematică şi Informatică al AŞM, Moldova, Republica</affiliation>
</creator>
<creator>
<creatorName>Ermacova, G.N.</creatorName>
<affiliation>Universitatea din Tiraspol „T.G. Şevcenko” , Moldova, Republica</affiliation>
</creator>
</creators>
<titles>
<title xml:lang='en'>On the number of group topologies on countable groups</title>
</titles>
<publisher>Instrumentul Bibliometric National</publisher>
<publicationYear>2014</publicationYear>
<relatedIdentifier relatedIdentifierType='ISSN' relationType='IsPartOf'>1024-7696</relatedIdentifier>
<subjects>
<subject>Countable group</subject>
<subject>group topology</subject>
<subject>Hausdorff topology</subject>
<subject>basis of the filter of neighborhoods</subject>
<subject schemeURI='http://udcdata.info/' subjectScheme='UDC'>512.546.6</subject>
</subjects>
<dates>
<date dateType='Issued'>2014-02-04</date>
</dates>
<resourceType resourceTypeGeneral='Text'>Journal article</resourceType>
<descriptions>
<description xml:lang='en' descriptionType='Abstract'>If a countable group G admits a non-discrete Hausdorff group topology, then the lattice of all group topologies of the group G admits:{ continuum c of non-discrete metrizable group topologies such that supf¿1; ¿2g is the discrete topology for any two of these topologies; { two to the power of continuum of coatoms in the lattice of all group topologies.</description>
</descriptions>
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