Group gradations on Leavitt path algebras

Nystedt, Patrik; Öinert, Johan

doi:10.1142/s0219498820501650

Cited by 20 publications

(34 citation statements)

References 13 publications

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“…Crucial to our investigation, Nystedt andÖinert have shown that a Leavitt path algebra associated to a finite directed graph is epsilon-strongly Z-graded (see [23,Thm. 1.2]).…”

Section: 3mentioning

confidence: 85%

“…However, since an epsilon-strong Z-grading is strong if and only if ǫ i = 1 for every i ∈ Z (see [23,Prop. 3.2]), it follows that the above Z-grading of M 2 (R) is not strong.…”

Section: 3mentioning

confidence: 99%

“…2]), corner skew Laurent polynomial rings (see [20,Thm. 8.1]) and Leavitt path algebras of finite graphs (see [23,Thm. 1.2]).…”

Section: Introductionmentioning

confidence: 99%

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Chain Conditions for Epsilon-Strongly Graded Rings with Applications to Leavitt Path Algebras

Lännström

2019

Algebr Represent Theor

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We provide a characterization of graded von Neumann regular rings involving the recently introduced class of nearly epsilon-strongly graded rings. As our main application, we generalize Hazrat's result that Leavitt path algebras over fields are graded von Neumann regular. More precisely, we show that a Leavitt path algebra LR(E) with coefficients in a unital ring R is graded von Neumann regular if and only if R is von Neumann regular. We also prove that both Leavitt path algebras and corner skew Laurent polynomial rings over von Neumann regular rings are semiprimitive and semiprime. Thereby, we generalize a result by Abrams and Aranda Pino on the semiprimitivity of Leavitt path algebras over fields.

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“…Crucial to our investigation, Nystedt andÖinert have shown that a Leavitt path algebra associated to a finite directed graph is epsilon-strongly Z-graded (see [23,Thm. 1.2]).…”

Section: 3mentioning

confidence: 85%

“…However, since an epsilon-strong Z-grading is strong if and only if ǫ i = 1 for every i ∈ Z (see [23,Prop. 3.2]), it follows that the above Z-grading of M 2 (R) is not strong.…”

Section: 3mentioning

confidence: 99%

See 1 more Smart Citation

Chain Conditions for Epsilon-Strongly Graded Rings with Applications to Leavitt Path Algebras

Lännström

2019

Algebr Represent Theor

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“…Given the exposed above, the importance of understanding the grading of a Leavitt path algebra is clear. In particular, the integer grading of a Leavitt path algebra has been studied in [20], where the unital Leavitt path algebras which are strongly graded are completely characterized, in [10,18], where strongly graded Leavitt path algebras are characterized in terms of Condition (Y), and in [23], where it is shown that the Leavitt path algebra associated to a finite graph is epsilon-strongly Z-graded. The grading over the free group of the edges has been introduced in [13] and has been used to give alternative proofs of interesting results, such as the Reduction Theorem and the simplicity criteria for Leavitt path algebras (see [13,16,12]) and is related to branching systems, see [6].…”

Section: Introductionmentioning

confidence: 99%

Properties of the gradings on ultragraph algebras via the underlying combinatorics

Royer¹

2021

Preprint

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There are two established gradings on Leavitt path algebras associated with ultragraphs, namely the grading by the integers group and the grading by the free group on the edges. In this paper, we characterize properties of these gradings in terms of the underlying combinatorial properties of the ultragraphs. More precisely, we characterize when the gradings are strong or epsilon-strong. The results regarding the free group on the edges are new also in the context of Leavitt path algebras of graphs. Finally, we also describe the relation between the strongness of the integer grading on an ultragraph Leavitt path algebra and the saturation of the gauge action associated with the corresponding ultragraph C*-algebra.

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“…1.2]). Seeking to extend their result, they introduced the notion of a nearly epsilonstrongly graded ring (see Definition 2.2) and proved that every Leavitt path algebra (even for infinite graphs) is nearly epsilon-strongly Z-graded (see [17,Thm. 1.3]).…”

mentioning

confidence: 99%

The graded structure of algebraic Cuntz-Pimsner rings

Lännström

2020

Journal of Pure and Applied Algebra

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Algebraic Cuntz-Pimsner rings are naturally Z-graded rings that generalize corner skew Laurent polynomial rings, Leavitt path algebras and unperforated Z-graded Steinberg algebras. In this article, we characterize strongly, epsilon-strongly and nearly epsilonstrongly Z-graded algebraic Cuntz-Pimsner rings up to graded isomorphism. We recover two results by Hazrat on when corner skew Laurent polynomial rings and Leavitt path algebras are strongly graded. As a further application, we characterize noetherian and artinian corner skew Laurent polynomial rings.

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Group gradations on Leavitt path algebras

Cited by 20 publications

References 13 publications

Chain Conditions for Epsilon-Strongly Graded Rings with Applications to Leavitt Path Algebras

Chain Conditions for Epsilon-Strongly Graded Rings with Applications to Leavitt Path Algebras

Properties of the gradings on ultragraph algebras via the underlying combinatorics

The graded structure of algebraic Cuntz-Pimsner rings

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