The schur multipliers, nonbelian tensor squares and capability of some finite p-groups

The homological functors and nonabelian tensor product have its roots in algebraic K-theory as well as in homotopy theory. Two of the homological functors are the Schur multiplier and nonabelian tensor square, where the nonabelian tensor square is a special case of the nonabelian tensor product. A g...

Full description

Saved in:
Bibliographic Details
Main Author: Zainal, Rosita
Format: Thesis
Language:English
Published: 2016
Subjects:
Online Access:http://eprints.utm.my/id/eprint/78974/1/RositaZainalPFS2016.pdf
Tags: Add Tag
No Tags, Be the first to tag this record!
id my-utm-ep.78974
record_format uketd_dc
spelling my-utm-ep.789742018-09-19T05:21:24Z The schur multipliers, nonbelian tensor squares and capability of some finite p-groups 2016 Zainal, Rosita QA Mathematics The homological functors and nonabelian tensor product have its roots in algebraic K-theory as well as in homotopy theory. Two of the homological functors are the Schur multiplier and nonabelian tensor square, where the nonabelian tensor square is a special case of the nonabelian tensor product. A group is said to be capable if it is a central factor group. In this research, the Schur multiplier, nonabelian tensor square and capability for some groups of order p3, p4, p5 and p6 are determined. An algebraic computation of the center, derived subgroups, abelianization, Schur multipliers, nonabelian tensor squares and capability of the groups are determined with the assistance of Groups, Algorithms and Programming (GAP) software. Using the results of the center, derived subgroups and abelianization, the Schur multiplier, nonabelian tensor square and capability for the groups are determined. The nonabelian tensor squares and capability are also determined using the results of the Schur multipliers. The Schur multiplier of each of the groups considered is found to be trivial or abelian. The results show that the nonabelian tensor square of the groups are always abelian. In addition, a group has been shown to be capable if it has a nontrivial kernel or it is an extra-special p-group with exponent p. 2016 Thesis http://eprints.utm.my/id/eprint/78974/ http://eprints.utm.my/id/eprint/78974/1/RositaZainalPFS2016.pdf application/pdf en public http://dms.library.utm.my:8080/vital/access/manager/Repository/vital:106252 phd doctoral Universiti Teknologi Malaysia, Faculty of Science Faculty of Science
institution Universiti Teknologi Malaysia
collection UTM Institutional Repository
language English
topic QA Mathematics
spellingShingle QA Mathematics
Zainal, Rosita
The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
description The homological functors and nonabelian tensor product have its roots in algebraic K-theory as well as in homotopy theory. Two of the homological functors are the Schur multiplier and nonabelian tensor square, where the nonabelian tensor square is a special case of the nonabelian tensor product. A group is said to be capable if it is a central factor group. In this research, the Schur multiplier, nonabelian tensor square and capability for some groups of order p3, p4, p5 and p6 are determined. An algebraic computation of the center, derived subgroups, abelianization, Schur multipliers, nonabelian tensor squares and capability of the groups are determined with the assistance of Groups, Algorithms and Programming (GAP) software. Using the results of the center, derived subgroups and abelianization, the Schur multiplier, nonabelian tensor square and capability for the groups are determined. The nonabelian tensor squares and capability are also determined using the results of the Schur multipliers. The Schur multiplier of each of the groups considered is found to be trivial or abelian. The results show that the nonabelian tensor square of the groups are always abelian. In addition, a group has been shown to be capable if it has a nontrivial kernel or it is an extra-special p-group with exponent p.
format Thesis
qualification_name Doctor of Philosophy (PhD.)
qualification_level Doctorate
author Zainal, Rosita
author_facet Zainal, Rosita
author_sort Zainal, Rosita
title The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
title_short The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
title_full The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
title_fullStr The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
title_full_unstemmed The schur multipliers, nonbelian tensor squares and capability of some finite p-groups
title_sort schur multipliers, nonbelian tensor squares and capability of some finite p-groups
granting_institution Universiti Teknologi Malaysia, Faculty of Science
granting_department Faculty of Science
publishDate 2016
url http://eprints.utm.my/id/eprint/78974/1/RositaZainalPFS2016.pdf
_version_ 1747818117113839616