Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal

A Bieberbach group is a torsion free crystallographic group that represents an extension of a free abelian lattice group by a finite point group. This research began by taking the group offered in the Crystallographic Algorithms and Tables (CARAT) package, which is in the matrix form. These groups a...

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Main Authors: Mohd Sarip, Nurain Mieza Mahirah, Muhktar, Siti Nuraishah, Zainal, Ani Ayuni
Format: Student Project
Language:English
Published: 2023
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Online Access:https://ir.uitm.edu.my/id/eprint/83549/1/83549.pdf
https://ir.uitm.edu.my/id/eprint/83549/
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spelling my.uitm.ir.835492023-09-14T04:58:24Z https://ir.uitm.edu.my/id/eprint/83549/ Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal Mohd Sarip, Nurain Mieza Mahirah Muhktar, Siti Nuraishah Zainal, Ani Ayuni Mathematical statistics. Probabilities A Bieberbach group is a torsion free crystallographic group that represents an extension of a free abelian lattice group by a finite point group. This research began by taking the group offered in the Crystallographic Algorithms and Tables (CARAT) package, which is in the matrix form. These groups are shown to be polycyclic. 2023 Student Project NonPeerReviewed text en https://ir.uitm.edu.my/id/eprint/83549/1/83549.pdf Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal. (2023) [Student Project] (Unpublished)
institution Universiti Teknologi Mara
building Tun Abdul Razak Library
collection Institutional Repository
continent Asia
country Malaysia
content_provider Universiti Teknologi Mara
content_source UiTM Institutional Repository
url_provider http://ir.uitm.edu.my/
language English
topic Mathematical statistics. Probabilities
spellingShingle Mathematical statistics. Probabilities
Mohd Sarip, Nurain Mieza Mahirah
Muhktar, Siti Nuraishah
Zainal, Ani Ayuni
Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
description A Bieberbach group is a torsion free crystallographic group that represents an extension of a free abelian lattice group by a finite point group. This research began by taking the group offered in the Crystallographic Algorithms and Tables (CARAT) package, which is in the matrix form. These groups are shown to be polycyclic.
format Student Project
author Mohd Sarip, Nurain Mieza Mahirah
Muhktar, Siti Nuraishah
Zainal, Ani Ayuni
author_facet Mohd Sarip, Nurain Mieza Mahirah
Muhktar, Siti Nuraishah
Zainal, Ani Ayuni
author_sort Mohd Sarip, Nurain Mieza Mahirah
title Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
title_short Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
title_full Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
title_fullStr Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
title_full_unstemmed Transformation of three crystallographic groups with matrix presentation into polycyclic / Nurain Mieza Mahirah Mohd Sarip, Siti Nuraishah Muhktar and Ani Ayuni Zainal
title_sort transformation of three crystallographic groups with matrix presentation into polycyclic / nurain mieza mahirah mohd sarip, siti nuraishah muhktar and ani ayuni zainal
publishDate 2023
url https://ir.uitm.edu.my/id/eprint/83549/1/83549.pdf
https://ir.uitm.edu.my/id/eprint/83549/
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