PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS

PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS

The concept of primeness in algebraic structures was initially developed through the ideal structure of the ring. The concept of a prime ideal was introduced as the concept of a prime ring. Suppose thatM is a left module over the ring R (written R - moduleM). A proper submodule N ofM is said to b...

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Main Author: Risnawita
Format: Dissertations
Language:Indonesia
Online Access:https://digilib.itb.ac.id/gdl/view/54830
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Institution: Institut Teknologi Bandung
Language: Indonesia
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spelling id-itb.:548302021-06-08T09:23:19ZPRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS Risnawita Indonesia Dissertations prime modules, path algebra, Leavitt path algebra INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/54830 The concept of primeness in algebraic structures was initially developed through the ideal structure of the ring. The concept of a prime ideal was introduced as the concept of a prime ring. Suppose thatM is a left module over the ring R (written R - moduleM). A proper submodule N ofM is said to be prime if rRm = 0 with r in R, and m ? M implies m ? N or rM ? N. An R-module M is a c-prime module in the sense that rm = 0 for one m ? M and r ? R implies that either r annihilates allM orm = 0. The aim of this study was to explore the notion of c-prime modules in the setting of path algebras and Leavitt path algebras. Let K be a field and E be a directed graph, and let A = KE be the path algebra that correspondence to E with coefficients in K. In this paper we prove that for any acyclic graph E, an A-module M is c-prime if and only if it is simple. We also discussed about primeness of simple modules over Leavitt path algebra. We prove that for some classes of simple modules over Leavitt path algebra, they are not c-prime modules. Moreover, we have also provided the necessary and sufficient conditions for the graph E so that there is a simple moduleM which is c-prime. We also discussed about primeness of graded simple modules over Leavitt path algebra. text
institution Institut Teknologi Bandung
building Institut Teknologi Bandung Library
continent Asia
country Indonesia
Indonesia
content_provider Institut Teknologi Bandung
collection Digital ITB
language Indonesia
description The concept of primeness in algebraic structures was initially developed through the ideal structure of the ring. The concept of a prime ideal was introduced as the concept of a prime ring. Suppose thatM is a left module over the ring R (written R - moduleM). A proper submodule N ofM is said to be prime if rRm = 0 with r in R, and m ? M implies m ? N or rM ? N. An R-module M is a c-prime module in the sense that rm = 0 for one m ? M and r ? R implies that either r annihilates allM orm = 0. The aim of this study was to explore the notion of c-prime modules in the setting of path algebras and Leavitt path algebras. Let K be a field and E be a directed graph, and let A = KE be the path algebra that correspondence to E with coefficients in K. In this paper we prove that for any acyclic graph E, an A-module M is c-prime if and only if it is simple. We also discussed about primeness of simple modules over Leavitt path algebra. We prove that for some classes of simple modules over Leavitt path algebra, they are not c-prime modules. Moreover, we have also provided the necessary and sufficient conditions for the graph E so that there is a simple moduleM which is c-prime. We also discussed about primeness of graded simple modules over Leavitt path algebra.
format Dissertations
author Risnawita
spellingShingle Risnawita
PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
author_facet Risnawita
author_sort Risnawita
title PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
title_short PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
title_full PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
title_fullStr PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
title_full_unstemmed PRIMENESS OF SIMPLE MODULES OVER PATH ALGEBRAS AND LEAVITT PATH ALGEBRAS
title_sort primeness of simple modules over path algebras and leavitt path algebras
url https://digilib.itb.ac.id/gdl/view/54830
_version_ 1822001890298167296

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