Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups

Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups

The nonabelian tensor product for a pair of groups is defined when the action act compatibly on each other. By using the necessary and sufficient conditions of two finite cyclic 2-groups, the compatible pairs of nontrivial actions for two same finite cyclic 2-groups with same order of actions are de...

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Main Authors: Sahimel Azwal, Sulaiman, Mohd Sham, Mohamad, Yuhani, Yusof, Shahoodh, Mohammed Khalid
Format: Conference or Workshop Item
Language:English
Published: Universiti Malaysia Pahang 2016
Subjects:
QA Mathematics
TA Engineering (General). Civil engineering (General)
Online Access:http://umpir.ump.edu.my/id/eprint/15015/
http://umpir.ump.edu.my/id/eprint/15015/
http://umpir.ump.edu.my/id/eprint/15015/1/P005%20pg39-42.pdf
id ump-15015
recordtype eprints
spelling ump-150152017-11-21T07:26:48Z http://umpir.ump.edu.my/id/eprint/15015/ Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups Sahimel Azwal, Sulaiman Mohd Sham, Mohamad Yuhani, Yusof Shahoodh, Mohammed Khalid QA Mathematics TA Engineering (General). Civil engineering (General) The nonabelian tensor product for a pair of groups is defined when the action act compatibly on each other. By using the necessary and sufficient conditions of two finite cyclic 2-groups, the compatible pairs of nontrivial actions for two same finite cyclic 2-groups with same order of actions are determined. Then, the general exact number of compatible pairs of nontrivial actions for two same finite cyclic 2-groups with same order of actions is given. Universiti Malaysia Pahang 2016 Conference or Workshop Item PeerReviewed application/pdf en http://umpir.ump.edu.my/id/eprint/15015/1/P005%20pg39-42.pdf Sahimel Azwal, Sulaiman and Mohd Sham, Mohamad and Yuhani, Yusof and Shahoodh, Mohammed Khalid (2016) Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups. In: Proceedings of The National Conference for Postgraduate Research (NCON-PGR 2016), 24-25 September 2016 , Universiti Malaysia Pahang (UMP), Pekan, Pahang. pp. 39-42.. http://ee.ump.edu.my/ncon/wp-content/uploads/2016/10/Proceeding-NCON-PGR-2016.zip
repository_type Digital Repository
institution_category Local University
institution Universiti Malaysia Pahang
building UMP Institutional Repository
collection Online Access
language English
topic QA Mathematics
TA Engineering (General). Civil engineering (General)
spellingShingle QA Mathematics
TA Engineering (General). Civil engineering (General)
Sahimel Azwal, Sulaiman
Mohd Sham, Mohamad
Yuhani, Yusof
Shahoodh, Mohammed Khalid
Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
description The nonabelian tensor product for a pair of groups is defined when the action act compatibly on each other. By using the necessary and sufficient conditions of two finite cyclic 2-groups, the compatible pairs of nontrivial actions for two same finite cyclic 2-groups with same order of actions are determined. Then, the general exact number of compatible pairs of nontrivial actions for two same finite cyclic 2-groups with same order of actions is given.
format Conference or Workshop Item
author Sahimel Azwal, Sulaiman
Mohd Sham, Mohamad
Yuhani, Yusof
Shahoodh, Mohammed Khalid
author_facet Sahimel Azwal, Sulaiman
Mohd Sham, Mohamad
Yuhani, Yusof
Shahoodh, Mohammed Khalid
author_sort Sahimel Azwal, Sulaiman
title Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
title_short Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
title_full Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
title_fullStr Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
title_full_unstemmed Compatible Pair Of Nontrivial Action For Finite Cyclic 2-Groups
title_sort compatible pair of nontrivial action for finite cyclic 2-groups
publisher Universiti Malaysia Pahang
publishDate 2016
url http://umpir.ump.edu.my/id/eprint/15015/
http://umpir.ump.edu.my/id/eprint/15015/
http://umpir.ump.edu.my/id/eprint/15015/1/P005%20pg39-42.pdf
first_indexed 2023-09-18T22:19:15Z
last_indexed 2023-09-18T22:19:15Z
_version_ 1777415545485787136

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