UPSI Digital Repository (UDRep)
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Abstract : Universiti Pendidikan Sultan Idris |
A Bieberbach group is a crystallographic group. This group is an extension of a finite point group and a free abelian group of finite rank. In this paper, a Bieberbach group with point group 2 2 C C? of dimension three is chosen where its polycyclic presentation is shown to be consistent. The nonabelian tensor square of group is a specialization of more general of the nonabelian tensor product of group. The nonabelian tensor square of group is one of the homological functors which can reveal the properties of the groups. Also, the nonabelian tensor squares are one of the important elements on computing homological functors of groups. The main objective of this paper is to compute the nonabelian tensor square of a Bieberbach group with point group 2 2 C C? of dimension three by using the computational method for polycyclic groups. The finding showed that the nonabelian tensor square of the group is abelian and be presented in terms of its generators. The findings of this research can be used to compute the other homological functors of this group
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References |
I. Abdul Ladi, N. F., Masri, R., Mohd Idrus, N., Sarmin, N. H., and Tan, Y. T. (2017). The Central Subgroup of the Nonabelian Tensor Squares of Some Bieberbach Groups with Elementary Abelian 2-group Point Group. Jurnal Teknologi. 79(7):115-121. II. Abdul Ladi, N. F., Masri, R., Mohd Idrus, N., Sarmin, N. H., and Tan, Y. T. (2017). The Nonabelian Tensor Squares of a Bieberbach Group with Elementary Abelian 2-group Point Group. Journal Fundamental and Applied Sciences. 9(7S):111-123. III. Abdul Ladi, N. F., Masri, R., Mohd Idrus, N., Sarmin, N. H., and Tan, Y. T. (2016). On The Generalization of The Abelianizations of Two Families of Bieberbach Groups with Elementary Abelian 2-Group Point Group. Proceeding of The 6th International Graduate Conference on Engineering, Science and Humanities 2016: 393 – 395. IV. Bacon, M. R. and Kappe, L. C. (2003). On Capable p-groups of Nilpotency Class Two. Illinois Journal of Mathematics. 47:49-62. V. Blyth, R. D. and Morse, R. F. (2009). Computing the nonabelian tensor squares of polycyclic groups. Journal of Algebra. 321:2139-2148. VI. Blyth, R. D., Fumagalli, F. and Morigi, M. (2010). Some Structural Results on the Non-abelian Tensor Square of Groups. Journal of Group Theory. 13:83-94. VII. Blyth, R. D., Moravec, P. and Morse, R. F. (2008). On the Nonabelian Tensor Squares of Free Nilpotent groups of finite rank. Contemporary Mathematics. 470:27-44. VIII. Brown, R. and Loday, J. L. (1987). Van Kampen Theorems for Diagram of Spaces. Topology. 26:311-335. IX. Brown, R., Johnson, D. L. and Robertson, E. F. (1987). Some Computations of Non-abelian Tensor Products of Groups. Journal Algebra. 111(1):177-202. X. Eick, B. and Nickel, W. (2008). Computing the Schur Multiplicator and the Nonabelian Tensor Square of Polycyclic Group. Journal of Algebra. 320(2):927-944. XI. Ellis, G. and Leonard, F. (1995). Computing Schur Multipliers and Tensor Products of Finite Groups, Vol. 2 of Proceedings Royal Irish Academy. Sect. 95A. XII. Mat Hassim, (2014). The Homological Functors of Bieberbach Groups with Cyclic Point Groups of Order Two, Three and Five. PhD Thesis, Universiti Teknologi Malaysia, Skudai, Malaysia. XIII. Masri, R. (2009). The Nonabelian Tensor Squares of Certain Bieberbach Groups with Cyclic Point Group of Order Two. PhD Thesis, Universiti Teknologi Malysia, Skudai, Malaysia. XIV. Mohd Idrus, N. (2011). Bieberbach Groups with Finite Point Groups. PhD Thesis, Universiti Teknologi Malysia, Skudai, Malaysia. XV. Rocco, N. R. (1991). On a Construction Related to The Nonabelian Tensor Squares of a Group. Bol. Soc. Brasil. Mat. (N. S.) 22(1):63-79. XVI. Sarmin, N. H., Kappe, L. C. and Visscher, M. P. (1999). Two-generator Two-groups of class two and their nonabelian Tensor Squares. Glasgow Mathematical Journal. 41(3):417-430. XVII. Tan, Y. T., Mohd Idrus, N., Masri, R., Wan Mohd Fauzi, W. N. F., Sarmin, N. H. and Mat Hassim, H. I. (2016a). The Nonabelian Tensor Square of Bieberbach Group with Symmetric Point Group of Order Six. Jurnal Teknologi. 78(1):189-193. XVIII. Tan, Y. T., Mohd Idrus, N., Masri, R., Sarmin, N. H. and Mat Hassim, H. I. (2016b). On the Generalization of the Nonabelian Tensor Square of Bieberbach Group with Symmetric Point Group. Indian Journal of Science and Technology. (In Press). XIX. Wan Mohd Fauzi, W. N. F., Mohd Idrus, N., Masri, R. and Tan, Y. T. (2014). On Computing the Nonabelian Tensor Square of Bieberbach Group with Dihedral Point Group of Order 8. Journal of Scence and Mathematics. Letters. (2):13-22. XX. Zomorodian, A. J. (2005). Topology for Computing. Cambridge University Press, NewYork, Chap. 4, pp.79 – 82.
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