<?xml version='1.0' encoding='utf-8'?>
<resource xmlns:xsi='http://www.w3.org/2001/XMLSchema-instance' xmlns='http://datacite.org/schema/kernel-3' xsi:schemaLocation='http://datacite.org/schema/kernel-3 http://schema.datacite.org/meta/kernel-3/metadata.xsd'>
<creators>
<creator>
<creatorName>Protic, P.V.</creatorName>
<affiliation>University of Nis, Serbia</affiliation>
</creator>
</creators>
<titles>
<title xml:lang='en'>Some remarks on Abel-Grassmann's groups</title>
</titles>
<publisher>Instrumentul Bibliometric National</publisher>
<publicationYear>2012</publicationYear>
<relatedIdentifier relatedIdentifierType='ISSN' relationType='IsPartOf'>1561-2848</relatedIdentifier>
<subjects>
<subject>Abel-Grassmann's groupoid</subject>
<subject>AG-groupoid</subject>
<subject>AG-group</subject>
</subjects>
<dates>
<date dateType='Issued'>2012-07-02</date>
</dates>
<resourceType resourceTypeGeneral='Text'>Journal article</resourceType>
<descriptions>
<description xml:lang='en' descriptionType='Abstract'>Abel-Grassmann's groupoids or shortly AG-groupoids have been considered in quite a number of papers, although under the dierent names (left-almost semigroups, left invertive groupoids). Abel-Grassmann's groups (AG-groups) is an Abel-Grassmann's groupoid with left identity in which every element has inverse. In this paper we describe AG-groups by equations. Also, we describe congruences on AG-groups.</description>
</descriptions>
<formats>
<format>application/pdf</format>
</formats>
</resource>