The Schur multiplier and capability of pairs of some finite groups

The homological functors of a group have its origin in homotopy theory and algebraic K-theory. The Schur multiplier of a group is one of the homological functors while the Schur multiplier of pairs of groups is an extension of the Schur multiplier of a group. Besides, a pair of groups is capable if...

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Main Author: Nawi, Adnin Afifi
Format: Thesis
Language:English
Published: 2017
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Online Access:http://eprints.utm.my/id/eprint/81764/1/AdninAfifiNawiPFS2017.pdf
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Institution: Universiti Teknologi Malaysia
Language: English
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spelling my.utm.817642019-09-29T10:53:47Z http://eprints.utm.my/id/eprint/81764/ The Schur multiplier and capability of pairs of some finite groups Nawi, Adnin Afifi QA Mathematics The homological functors of a group have its origin in homotopy theory and algebraic K-theory. The Schur multiplier of a group is one of the homological functors while the Schur multiplier of pairs of groups is an extension of the Schur multiplier of a group. Besides, a pair of groups is capable if the precise center or epicenter of the pair of groups is trivial. In this research, the Schur multiplier and capability of pairs of groups of order p, p2, p3, p4, pq, p2q and p3q (where p and q are distinct odd primes) were determined. This research started with the computation of the normal subgroups of the groups. The generalized structures of the normal subgroups have been found by the assistance of Groups, Algorithms and Programming (GAP) software. By using the Sylow theorems and the results of the nonabelian tensor products, derived subgroups, centers of the groups, abelianization of the groups and the Schur multiplier of the groups, the Schur multiplier of pairs of groups of order p, p2, pq, p2q, p3, p4 and p3q were then determined. The classification of the groups had also been used in the computation of the Schur multiplier and capability of pairs of groups. The order of the epicenter of pairs of groups of order p, p2, p3, p4 and pq were also computed by using GAP software to determine the capability of pairs of the groups. The Schur multiplier of pairs of group is found to be trivial or abelian. All pairs of groups where G is isomorphic to the elementary abelian groups of order p2, p3 and p4, nonabelian group of order p3 of exponent p, direct product of two cyclic groups of order p2, semi- direct product of two cyclic groups of order p2, and direct product of cyclic group of order p and nonabelian group of order p3 of exponent p are capable. For other groups, only certain pairs of groups are capable depending on their normal subgroups. 2017-06 Thesis NonPeerReviewed application/pdf en http://eprints.utm.my/id/eprint/81764/1/AdninAfifiNawiPFS2017.pdf Nawi, Adnin Afifi (2017) The Schur multiplier and capability of pairs of some finite groups. PhD thesis, Universiti Teknologi Malaysia, Faculty of Science. http://dms.library.utm.my:8080/vital/access/manager/Repository/vital:126138
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/
language English
topic QA Mathematics
spellingShingle QA Mathematics
Nawi, Adnin Afifi
The Schur multiplier and capability of pairs of some finite groups
description The homological functors of a group have its origin in homotopy theory and algebraic K-theory. The Schur multiplier of a group is one of the homological functors while the Schur multiplier of pairs of groups is an extension of the Schur multiplier of a group. Besides, a pair of groups is capable if the precise center or epicenter of the pair of groups is trivial. In this research, the Schur multiplier and capability of pairs of groups of order p, p2, p3, p4, pq, p2q and p3q (where p and q are distinct odd primes) were determined. This research started with the computation of the normal subgroups of the groups. The generalized structures of the normal subgroups have been found by the assistance of Groups, Algorithms and Programming (GAP) software. By using the Sylow theorems and the results of the nonabelian tensor products, derived subgroups, centers of the groups, abelianization of the groups and the Schur multiplier of the groups, the Schur multiplier of pairs of groups of order p, p2, pq, p2q, p3, p4 and p3q were then determined. The classification of the groups had also been used in the computation of the Schur multiplier and capability of pairs of groups. The order of the epicenter of pairs of groups of order p, p2, p3, p4 and pq were also computed by using GAP software to determine the capability of pairs of the groups. The Schur multiplier of pairs of group is found to be trivial or abelian. All pairs of groups where G is isomorphic to the elementary abelian groups of order p2, p3 and p4, nonabelian group of order p3 of exponent p, direct product of two cyclic groups of order p2, semi- direct product of two cyclic groups of order p2, and direct product of cyclic group of order p and nonabelian group of order p3 of exponent p are capable. For other groups, only certain pairs of groups are capable depending on their normal subgroups.
format Thesis
author Nawi, Adnin Afifi
author_facet Nawi, Adnin Afifi
author_sort Nawi, Adnin Afifi
title The Schur multiplier and capability of pairs of some finite groups
title_short The Schur multiplier and capability of pairs of some finite groups
title_full The Schur multiplier and capability of pairs of some finite groups
title_fullStr The Schur multiplier and capability of pairs of some finite groups
title_full_unstemmed The Schur multiplier and capability of pairs of some finite groups
title_sort schur multiplier and capability of pairs of some finite groups
publishDate 2017
url http://eprints.utm.my/id/eprint/81764/1/AdninAfifiNawiPFS2017.pdf
http://eprints.utm.my/id/eprint/81764/
http://dms.library.utm.my:8080/vital/access/manager/Repository/vital:126138
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