Staff View: The central subgroup of the nonabelian tensor square of a torsion free space group

The central subgroup of the nonabelian tensor square of a torsion free space group

Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the central subgroup of the nonabelian tensor square of a group. It is a normal subgroup of the group which can be ascertained by finding the abelianisation of the group and the nonabelian tensor square of t...

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Main Authors:	Mohammad, S. A., Sarmin, N. H., Hassim, H. I. M.
Format:	Conference or Workshop Item
Published:	American Institute of Physics Inc. 2016
Subjects:	QA Mathematics
Online Access:	http://eprints.utm.my/id/eprint/73200/ https://www.scopus.com/inward/record.uri?eid=2-s2.0-84984588470&doi=10.1063%2f1.4954593&partnerID=40&md5=e7aaa4bbef3a84625bd1cf0e70b8dd7a
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spelling	my.utm.732002017-11-23T04:17:45Z http://eprints.utm.my/id/eprint/73200/ The central subgroup of the nonabelian tensor square of a torsion free space group Mohammad, S. A. Sarmin, N. H. Hassim, H. I. M. QA Mathematics Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the central subgroup of the nonabelian tensor square of a group. It is a normal subgroup of the group which can be ascertained by finding the abelianisation of the group and the nonabelian tensor square of the abelianisation group. In this research, our focus is to explicate the central subgroup of the nonabelian tensor square of the torsion free space groups of a crystal which are called the Bieberbach groups. American Institute of Physics Inc. 2016 Conference or Workshop Item PeerReviewed Mohammad, S. A. and Sarmin, N. H. and Hassim, H. I. M. (2016) The central subgroup of the nonabelian tensor square of a torsion free space group. In: 23rd Malaysian National Symposium of Mathematical Sciences: Advances in Industrial and Applied Mathematics, SKSM 2015, 24 November 2015 through 26 November 2015, Johor Bahru; Malaysia. https://www.scopus.com/inward/record.uri?eid=2-s2.0-84984588470&doi=10.1063%2f1.4954593&partnerID=40&md5=e7aaa4bbef3a84625bd1cf0e70b8dd7a
institution	Universiti Teknologi Malaysia
building	UTM Library
collection	Institutional Repository
continent	Asia
country	Malaysia
content_provider	Universiti Teknologi Malaysia
content_source	UTM Institutional Repository
url_provider	http://eprints.utm.my/
topic	QA Mathematics
spellingShingle	QA Mathematics Mohammad, S. A. Sarmin, N. H. Hassim, H. I. M. The central subgroup of the nonabelian tensor square of a torsion free space group
description	Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the central subgroup of the nonabelian tensor square of a group. It is a normal subgroup of the group which can be ascertained by finding the abelianisation of the group and the nonabelian tensor square of the abelianisation group. In this research, our focus is to explicate the central subgroup of the nonabelian tensor square of the torsion free space groups of a crystal which are called the Bieberbach groups.
format	Conference or Workshop Item
author	Mohammad, S. A. Sarmin, N. H. Hassim, H. I. M.
author_facet	Mohammad, S. A. Sarmin, N. H. Hassim, H. I. M.
author_sort	Mohammad, S. A.
title	The central subgroup of the nonabelian tensor square of a torsion free space group
title_short	The central subgroup of the nonabelian tensor square of a torsion free space group
title_full	The central subgroup of the nonabelian tensor square of a torsion free space group
title_fullStr	The central subgroup of the nonabelian tensor square of a torsion free space group
title_full_unstemmed	The central subgroup of the nonabelian tensor square of a torsion free space group
title_sort	central subgroup of the nonabelian tensor square of a torsion free space group
publisher	American Institute of Physics Inc.
publishDate	2016
url	http://eprints.utm.my/id/eprint/73200/ https://www.scopus.com/inward/record.uri?eid=2-s2.0-84984588470&doi=10.1063%2f1.4954593&partnerID=40&md5=e7aaa4bbef3a84625bd1cf0e70b8dd7a
_version_	1643656602968915968
score	13.211869

The central subgroup of the nonabelian tensor square of a torsion free space group

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