ALJABAR LINTASAN LEAVITT SEMIPRIMA (SEMIPRIME LEAVITT PATH ALGEBRA)
A graph can be represented into path algebra over field K by additing two axioms, denoted by KE. If the graph is extended and added by axiom CK1 and CK2, then can be defined Leavitt path algebra that is denoted by LK(E). In fact, KE is sub algebra of LK(E) which elemens are generated by path with re...
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| Format: | Thesis |
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[Yogyakarta] : Universitas Gadjah Mada
2012
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| Summary: | A graph can be represented into path algebra over field K by additing two
axioms, denoted by KE. If the graph is extended and added by axiom CK1 and
CK2, then can be defined Leavitt path algebra that is denoted by LK(E). In fact,
KE is sub algebra of LK(E) which elemens are generated by path with real edge.
In this paper will discussed about semiprime path algebra and semiprime Leavitt
path algebra in any graph. As well as, discussed about socle of an arbitrary
semiprime Leavitt path algebra. |
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