Hazzirah Izzati Mat Hassim scite author profile

Hazzirah Izzati Mat Hassim

5Publications

5Citation Statements Received

19Citation Statements Given

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Affiliations

University of Technology Malaysia

Publications

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The homological functor of a Bieberbach group with a cyclic point group of order two

Hassim¹,

Sarmin²,

Ali³

et al. 2014

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Abstract. The generalized presentation of a Bieberbach group with cyclic point group of order two can be obtained from the fact that any Bieberbach group of dimension n is a direct product of the group of the smallest dimension with a free abelian group. In this paper, by using the group presentation, the homological functor of a Bieberbach group a with cyclic point group of order two of dimension n is found.

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On the Generalization of the Nonabelian Tensor Square of a Bieberbach Group with Symmetric Point Group

Tan

MohdIdrus

Masri

et al. 2016

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The central subgroup of the nonabelian tensor square of a torsion free space group

Mohammad

Sarmin²,

Hassim³

2016

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Abstract. Space groups of a crystal expound its symmetry properties. One of the symmetry properties is the central subgroup of the nonabelian tensor square of a group. It is a normal subgroup of the group which can be ascertained by finding the abelianisation of the group and the nonabelian tensor square of the abelianisation group. In this research, our focus is to explicate the central subgroup of the nonabelian tensor square of the torsion free space groups of a crystal which are called the Bieberbach groups.

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The conjugacy class graphs of non-abelian 3-groups

Zulkarnain

Sarmin

Hassim

2020

Mal. J. Fund. Appl. Sci.

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A graph is formed by a pair of vertices and edges. It can be related to groups by using the groups’ properties for its vertices and edges. The set of vertices of the graph comprises the elements or sets from the group while the set of edges of the graph is the properties and condition for the graph. A conjugacy class of an element is the set of elements that are conjugated with . Any element of a group , labelled as , is conjugated to if it satisfies for some elements in with its inverse . A conjugacy class graph of a group is defined when its vertex set is the set of non-central conjugacy classes of . Two distinct vertices and are connected by an edge if and only if their cardinalities are not co-prime, which means that the order of the conjugacy classes of and have common factors. Meanwhile, a simple graph is the graph that contains no loop and no multiple edges. A complete graph is a simple graph in which every pair of distinct vertices is adjacent. Moreover, a -group is the group with prime power order. In this paper, the conjugacy class graphs for some non-abelian 3-groups are determined by using the group’s presentations and the definition of conjugacy class graph. There are two classifications of the non-abelian 3-groups which are used in this research. In addition, some properties of the conjugacy class graph such as the chromatic number, the dominating number, and the diameter are computed. A chromatic number is the minimum number of vertices that have the same colours where the adjacent vertices have distinct colours. Besides, a dominating number is the minimum number of vertices that is required to connect all the vertices while a diameter is the longest path between any two vertices. As a result of this research, the conjugacy class graphs of these groups are found to be complete graphs with chromatic number, dominating number and diameter that are equal to eight, one and one, respectively.

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The Exterior Square of a Bieberbach Group with Quaternion Point Group of Order Eight

Mohammad¹,

Sarmin²,

Hassim³

2020

ASMSJ

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A Bieberbach group is defined to be a torsion free crystallographic group which is an extension of a free abelian lattice group by a finite point group. This paper aims to determine a mathematical representation of a Bieberbach group with quaternion point group of order eight. Such mathematical representation is the exterior square. Mathematical method from representation theory is used to find the exterior square of this group. The exterior square of this group is found to be nonabelian. Keywords: mathematical structure; exterior square; Bieberbach group; quaternion point group

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