Combinatorial structure associated with low-dimensional filiform leibniz algebras
This thesis is concerned on the studying a graph representation of (n + 1)- dimensional filiform Leibniz algebras. The filiform Leibniz algebras contain three subclasses called first, second and third class that are denoted in dimension n over a field K, by FLbn(K), SLbn(K) and TLbn(K), respec...
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| フォーマット: | 学位論文 |
| 言語: | English |
| 出版事項: |
2017
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| オンライン・アクセス: | http://psasir.upm.edu.my/id/eprint/69419/1/IPM%202018%202%20IR.pdf http://psasir.upm.edu.my/id/eprint/69419/ |
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| 要約: | This thesis is concerned on the studying a graph representation of (n + 1)-
dimensional filiform Leibniz algebras. The filiform Leibniz algebras contain three
subclasses called first, second and third class that are denoted in dimension n over a
field K, by FLbn(K), SLbn(K) and TLbn(K), respectively.
This research deals with combinatorial structures associated with FLbn(K) and
SLbn(K). Therefore, an algorithm is defined in order to construct such structures
associated with filiform Leibniz algebras. By using the table of multiplication of
filiform Leibniz algebras, an algorithm for the combinatorial structures associated
with filiform Leibniz algebras will be obtained.
Next, the structural properties of the combinatorial structure will be constructed
to show the non-isomorphism between two classes of filiform Leibniz algebras in
such a way of graph theory. Hence, some propositions on combinatorial structures
regarding number of vertices and edge, components, degree of vertices, diameter
and degree sequences are given.
Besides that, an algorithm will be used on association the combinatorial structures
with the isomorphism classes of FLbn(K) and SLbn(K). Thus, any two isomorphism
classes of FLbn(K) or SLbn(K) are non-isomorphic using combinatorial structures. |
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