The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order
The non-abelian tensor product of groups has its origins in the algebraic K-theory and homotopy theory. The nonabelian tensor product for a pair of groups is defined when the actions act compatibly on each other. This research is to determine the maximum number of a compatible pair of actions that c...
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United Kingdom Simulation Society
2017
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ump-200422018-01-18T02:45:39Z http://umpir.ump.edu.my/id/eprint/20042/ The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order Sahimel Azwal, Sulaiman Yuhani, Yusof Shahoodh, Mohammed Khalid QA Mathematics The non-abelian tensor product of groups has its origins in the algebraic K-theory and homotopy theory. The nonabelian tensor product for a pair of groups is defined when the actions act compatibly on each other. This research is to determine the maximum number of a compatible pair of actions that can be identified between two cyclic groups of 2-power order for nonabelian tensor product. The compatible pair of actions between two cyclic groups of 2-power order can be found by using the necessary and sufficient conditions of two cyclic groups of 2-power order acting compatibly on each other. Hence, the number of the compatible pair of actions between two cyclic groups of the 2-power order is determined. United Kingdom Simulation Society 2017-12 Article PeerReviewed application/pdf en http://umpir.ump.edu.my/id/eprint/20042/1/ijssst%202.pdf Sahimel Azwal, Sulaiman and Yuhani, Yusof and Shahoodh, Mohammed Khalid (2017) The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order. International Journal of Simulation Systems, Science & Technology, 18 (4). 2.1-2.8. ISSN 1473-8031(Print); 1473-804x (Online) http://ijssst.info/Vol-18/No-4/paper2.pdf DOI 10.5013/IJSSST.a.18.04.02 |
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Digital Repository |
| institution_category |
Local University |
| institution |
Universiti Malaysia Pahang |
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UMP Institutional Repository |
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Online Access |
| language |
English |
| topic |
QA Mathematics |
| spellingShingle |
QA Mathematics Sahimel Azwal, Sulaiman Yuhani, Yusof Shahoodh, Mohammed Khalid The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| description |
The non-abelian tensor product of groups has its origins in the algebraic K-theory and homotopy theory. The nonabelian tensor product for a pair of groups is defined when the actions act compatibly on each other. This research is to determine the maximum number of a compatible pair of actions that can be identified between two cyclic groups of 2-power order for nonabelian tensor product. The compatible pair of actions between two cyclic groups of 2-power order can be found by using the necessary and sufficient conditions of two cyclic groups of 2-power order acting compatibly on each other. Hence, the number of the compatible pair of actions between two cyclic groups of the 2-power order is determined. |
| format |
Article |
| author |
Sahimel Azwal, Sulaiman Yuhani, Yusof Shahoodh, Mohammed Khalid |
| author_facet |
Sahimel Azwal, Sulaiman Yuhani, Yusof Shahoodh, Mohammed Khalid |
| author_sort |
Sahimel Azwal, Sulaiman |
| title |
The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| title_short |
The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| title_full |
The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| title_fullStr |
The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| title_full_unstemmed |
The Number of Compatible Pair of Actions for Cyclic Groups of 2-Power Order |
| title_sort |
number of compatible pair of actions for cyclic groups of 2-power order |
| publisher |
United Kingdom Simulation Society |
| publishDate |
2017 |
| url |
http://umpir.ump.edu.my/id/eprint/20042/ http://umpir.ump.edu.my/id/eprint/20042/ http://umpir.ump.edu.my/id/eprint/20042/ http://umpir.ump.edu.my/id/eprint/20042/1/ijssst%202.pdf |
| first_indexed |
2023-09-18T22:28:42Z |
| last_indexed |
2023-09-18T22:28:42Z |
| _version_ |
1777416140577832960 |