TY  - BOOK
AU  - Fatma Elzahra'a Goma'a Abdelhalim
AU  - Gonzalo Aranda Pino , 
AU  - Nefertiti Megahed , 
AU  - Tarek Sayed Ahmed , 
TI  - Structure of leavitt path algebras of graphs / 
PY  - 2014///
CY  - Cairo : 
PB  - Fatma Elzahra'a Goma'a Abdelhalim , 
KW  - Exchange
KW  - Leavitt path algebras
KW  - Purely infinite simple
N1  - Thesis (M.Sc.) - Cairo University - Faculty of Science - Department of Mathematics; Issued also as CD
N2  - In this thesis, we study some properties of leavitt path algebras over countable row - finite graphs and show how these properties can be transferred to arbitrary (countable and uncountable) graphs. Leavitt path algebras are specific types of path K- algebras (where K is an arbitrary field) associated to a graph E, modulo some relations. Its appearance for row - finite countable graphs (i.e. countable graphs in which each vertex emits at most a finite number of edges) took place in [1] and [12]. They have become a subject of significant interest both for algebraists and analysts working in C*- algebras
UR  - http://172.23.153.220/th.pdf
ER  -