About: Leavitt path algebra

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In mathematics, a Leavitt path algebra is a universal algebra constructed from a directed graph. The Leavitt path algebras generalize the and may also be considered as algebraic analogues of the graph C*-algebras. Leavitt path algebras were simultaneously introduced in 2005 by Gene Abrams and Gonzalo Aranda Pino as well as by Pere Ara, María Moreno, and Enrique Pardo, with neither of the two groups aware of the other's work. Leavitt path algebras have been investigated by dozens of mathematicians since their introduction, and in 2020 Leavitt path algebras were added to the Mathematics Subject Classification with code 16S88 under the general discipline of Associative Rings and Algebras.

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dbo:abstract	In mathematics, a Leavitt path algebra is a universal algebra constructed from a directed graph. The Leavitt path algebras generalize the and may also be considered as algebraic analogues of the graph C*-algebras. Leavitt path algebras were simultaneously introduced in 2005 by Gene Abrams and Gonzalo Aranda Pino as well as by Pere Ara, María Moreno, and Enrique Pardo, with neither of the two groups aware of the other's work. Leavitt path algebras have been investigated by dozens of mathematicians since their introduction, and in 2020 Leavitt path algebras were added to the Mathematics Subject Classification with code 16S88 under the general discipline of Associative Rings and Algebras. (en)
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rdfs:comment	In mathematics, a Leavitt path algebra is a universal algebra constructed from a directed graph. The Leavitt path algebras generalize the and may also be considered as algebraic analogues of the graph C*-algebras. Leavitt path algebras were simultaneously introduced in 2005 by Gene Abrams and Gonzalo Aranda Pino as well as by Pere Ara, María Moreno, and Enrique Pardo, with neither of the two groups aware of the other's work. Leavitt path algebras have been investigated by dozens of mathematicians since their introduction, and in 2020 Leavitt path algebras were added to the Mathematics Subject Classification with code 16S88 under the general discipline of Associative Rings and Algebras. (en)
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