A homological invariant of certain torsion free crystallographic groups
Several homological invariants namely the nonabelian tensor square, the exterior square and the Schur multiplier of groups have been of research interests by group theorists over the years. Besides, there are also some other homological invariants which can be deduced from these invariants, as examp...
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my.utm.910472021-05-31T13:29:07Z http://eprints.utm.my/id/eprint/91047/ A homological invariant of certain torsion free crystallographic groups Mat Hassim, HazzirahIzzati Sarmin, Nor Haniza Mohd. Ali, Nor Muhainiah QA Mathematics Several homological invariants namely the nonabelian tensor square, the exterior square and the Schur multiplier of groups have been of research interests by group theorists over the years. Besides, there are also some other homological invariants which can be deduced from these invariants, as example, the central subgroup of the nonabelian tensor square of a group G, known as ()G?. The computations of the homological invariants of crystallographic groups strengthen the link between group theory with crystallography theory. In this paper, ()G?is determined for certain torsion free crystallographic groups focusing on those with cyclic point groups of order three and five. Akademi Sains Malaysia 2020 Article PeerReviewed Mat Hassim, HazzirahIzzati and Sarmin, Nor Haniza and Mohd. Ali, Nor Muhainiah (2020) A homological invariant of certain torsion free crystallographic groups. ASM Science Journal, 13 . p. 8. ISSN 1935-7885 http://dx.doi.org/10.32802/asmscj.2020.sm26(5.4) |
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QA Mathematics Mat Hassim, HazzirahIzzati Sarmin, Nor Haniza Mohd. Ali, Nor Muhainiah A homological invariant of certain torsion free crystallographic groups |
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Several homological invariants namely the nonabelian tensor square, the exterior square and the Schur multiplier of groups have been of research interests by group theorists over the years. Besides, there are also some other homological invariants which can be deduced from these invariants, as example, the central subgroup of the nonabelian tensor square of a group G, known as ()G?. The computations of the homological invariants of crystallographic groups strengthen the link between group theory with crystallography theory. In this paper, ()G?is determined for certain torsion free crystallographic groups focusing on those with cyclic point groups of order three and five. |
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Article |
author |
Mat Hassim, HazzirahIzzati Sarmin, Nor Haniza Mohd. Ali, Nor Muhainiah |
author_facet |
Mat Hassim, HazzirahIzzati Sarmin, Nor Haniza Mohd. Ali, Nor Muhainiah |
author_sort |
Mat Hassim, HazzirahIzzati |
title |
A homological invariant of certain torsion free crystallographic groups |
title_short |
A homological invariant of certain torsion free crystallographic groups |
title_full |
A homological invariant of certain torsion free crystallographic groups |
title_fullStr |
A homological invariant of certain torsion free crystallographic groups |
title_full_unstemmed |
A homological invariant of certain torsion free crystallographic groups |
title_sort |
homological invariant of certain torsion free crystallographic groups |
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Akademi Sains Malaysia |
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2020 |
url |
http://eprints.utm.my/id/eprint/91047/ http://dx.doi.org/10.32802/asmscj.2020.sm26(5.4) |
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