2013-2017 Ph.D, Pure mathematics/ University of York (United Kingdom)
2005-2007 M.Sc., Pure mathematics/ University of Baghdad (Iraq)
2001-2005 B.Sc., Mathematics / University of Baghdad (Iraq)
- Algebra,
- simegroup theory
- ring theory,
- group theory,
- Geaph theory.
Pure Mathematics/ Semigroup
Teaching duties
1- Group Theory 2- Graph Theory 3- Topology 4- Applied mathematics (Culculas)
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Let G be a finite group and X be a G-conjugacy of elements of order 3. The A4-graph of G is a simple graph with vertex set X and two vertices x,yÎX are linked if x≠ y and xy-1 is an involution element. This paper aims to investigate the A4-graph properties for the monster Held group He.
It is well known that the wreath product is the endmorphism monoid of a free S-act with n-generators. If S is a trivial semigroup then is isomorphic to . The extension for to where is an independent algebra has been investigated. In particular, we consider is to be , where is a free left S-act of n-generators. The eventual goal of this paper is to show that is an endomorphism monoid of a free left S-act of n-generators and to prove that is embedded in the wreath product .
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