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2017 | OriginalPaper | Chapter

7. Generalizations, Applications, and Current Lines of Research

Authors : Gene Abrams, Pere Ara, Mercedes Siles Molina

Published in: Leavitt Path Algebras

Publisher: Springer London

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Abstract

We conclude the book with various observations regarding three important aspects of Leavitt path algebras. First, we describe various generalizations of, and constructions related to, Leavitt path algebras. Next, we present some applications of Leavitt path algebras (specifically, we give some examples of results from outside the subject of Leavitt path algebras per se which have been established using the machinery developed for Leavitt path algebras). Finally, we consider some still-unresolved questions of interest.

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previous chapter K-Theory

Gene Abrams. Leavitt path algebras: the first decade. Bull. Math. Sci., 5(1):59–120, 2015.MathSciNetCrossRefMATH

Gene Abrams, Pham N. Ánh, Adel Louly, and Enrique Pardo. The classification question for Leavitt path algebras. J. Algebra, 320(5):1983–2026, 2008.MathSciNetCrossRefMATH

Gene Abrams, Pham N. Ánh, and Enrique Pardo. Isomorphisms between Leavitt algebras and their matrix rings. J. Reine Angew. Math., 624:103–132, 2008.MathSciNetMATH

Gene Abrams and Gonzalo Aranda Pino. The Leavitt path algebra of a graph. J. Algebra, 293(2):319–334, 2005.

10.

Gene Abrams, Jason P. Bell, and Kulumani M. Rangaswamy. On prime nonprimitive von Neumann regular algebras. Trans. Amer. Math. Soc., 366(5):2375–2392, 2014.MathSciNetCrossRefMATH

14.

Gene Abrams and Mark Tomforde. A class of C ^∗-algebras that are prime but not primitive. Münster J. Math., 7(2):489–514, 2014.MathSciNetMATH

19.

Pere Ara. The realization problem for von Neumann regular rings. In Ring theory 2007, pages 21–37. World Sci. Publ., Hackensack, NJ, 2009.

21.

Pere Ara and Miquel Brustenga. The regular algebra of a quiver. J. Algebra, 309(1):207–235, 2007.MathSciNetCrossRefMATH

23.

Pere Ara, Miquel Brustenga, and Guillermo Cortiñas. K-theory of Leavitt path algebras. Münster J. Math., 2:5–33, 2009.MathSciNetMATH

25.

Pere Ara, María A. González-Barroso, Kenneth R. Goodearl, and Enrique Pardo. Fractional skew monoid rings. J. Algebra, 278(1):104–126, 2004.MathSciNetCrossRefMATH

27.

Pere Ara and Kenneth R. Goodearl. Leavitt path algebras of separated graphs. J. Reine Angew. Math., 669:165–224, 2012.MathSciNetMATH

31.

Pere Ara, María A. Moreno, and Enrique Pardo. Nonstable K-theory for graph algebras. Algebr. Represent. Theory, 10(2):157–178, 2007.MathSciNetCrossRefMATH

33.

Pere Ara and Enrique Pardo. Towards a K-theoretic characterization of graded isomorphisms between Leavitt path algebras. J. K-Theory, 14(2):203–245, 2014.MathSciNetCrossRefMATH

34.

Pere Ara and Enrique Pardo. Representing finitely generated refinement monoids as graph monoids. J. Algebra, 480:79–123, 2017.MathSciNetCrossRefMATH

37.

Gonzalo Aranda Pino, John Clark, Astrid an Huef, and Iain Raeburn. Kumjian-Pask algebras of higher-rank graphs. Trans. Amer. Math. Soc., 365(7):3613–3641, 2013.

38.

Gonzalo Aranda Pino and Kathi Crow. The center of a Leavitt path algebra. Rev. Mat. Iberoam., 27(2):621–644, 2011.

54.

Jonathan Brown, Lisa Orloff Clark, Cynthia Farthing, and Aidan Sims. Simplicity of algebras associated to étale groupoids. Semigroup Forum, 88(2):433–452, 2014.

58.

Nathan Brownlowe and Adam P. W. Sørensen. \(L_{2,\mathbb{Z}} \otimes L_{2,\mathbb{Z}}\) does not embed in \(L_{2,\mathbb{Z}}\). J. Algebra, 456:1–22, 2016.

60.

Lisa Orloff Clark and Cain Edie-Michell. Uniqueness theorems for Steinberg algebras. Algebr. Represent. Theory, 18(4):907–916, 2015.

61.

Lisa Orloff Clark, Cynthia Farthing, Aidan Sims, and Mark Tomforde. A groupoid generalisation of Leavitt path algebras. Semigroup Forum, 89(3):501–517, 2014.

62.

Lisa Orloff Clark, Dolores Martin Barquero, Cándido Martin Gonzalez, and Mercedes Siles Molina. Using the Steinberg algebra model to determine the center of any Leavitt path algebra. To appear in Israel Journal of Mathematics. arXiv, 1604.01079:1–14, 2016.

63.

Lisa Orloff Clark and Aidan Sims. Equivalent groupoids have Morita equivalent Steinberg algebras. J. Pure Appl. Algebra, 219(6):2062–2075, 2015.

65.

María G. Corrales García, Dolores Martín Barquero, Cándido Martín González, Mercedes Siles Molina, and José F. Solanilla Hernández. Extreme cycles. The center of a Leavitt path algebra. Publ. Mat., 60(1):235–263, 2016.

75.

O.I. Domanov. A prime but not primitive regular ring. Uspehi Mat. Nauk, 32(6(198)):219–220, 1977.

82.

James Gabe, Efren Ruiz, Mark Tomforde, and Tristan Whalen. K-theory for Leavitt path algebras: Computation and classification. J. Algebra, 433:35–72, 2015.MathSciNetCrossRefMATH

92.

Roozbeh Hazrat. The graded Grothendieck group and the classification of Leavitt path algebras. Math. Ann., 355(1):273–325, 2013.MathSciNetCrossRefMATH

93.

Roozbeh Hazrat. A note on the isomorphism conjectures for Leavitt path algebras. J. Algebra, 375:33–40, 2013.MathSciNetCrossRefMATH

94.

Roozbeh Hazrat. Graded rings and graded Grothendieck groups, volume 435 of London Mathematical Society Lecture Note Series. Cambridge University Press, Cambridge, 2016.CrossRef

96.

Danrun Huang. Flow equivalence of reducible shifts of finite type. Ergodic Theory Dynam. Systems, 14(4):695–720, 1994.MathSciNetCrossRefMATH

102.

Irving Kaplansky. Algebraic and analytic aspects of operator algebras. American Mathematical Society, Providence, R.I., 1970. Conference Board of the Mathematical Sciences Regional Conference Series in Mathematics, No. 1.

104.

Alex Kumjian and David Pask. Higher rank graph C ^∗-algebras. New York J. Math., 6:1–20, 2000.MathSciNetMATH

107.

Tsit-Yen Lam. A first course in noncommutative rings, volume 131 of Graduate Texts in Mathematics. Springer-Verlag, New York, second edition, 2001.

112.

William G. Leavitt. The module type of a ring. Trans. Amer. Math. Soc., 103:113–130, 1962.MathSciNetCrossRefMATH

125.

Enrique Pardo. The isomorphism problem for Higman–Thompson groups. J. Algebra, 344:172–183, 2011.MathSciNetCrossRefMATH

127.

William L. Paschke and Norberto Salinas. Matrix algebras over \(\mathscr{O}_{n}\). Michigan Math. J., 26(1):3–12, 1979.MathSciNetCrossRefMATH

138.

Efren Ruiz and Mark Tomforde. Classification of unital simple Leavitt path algebras of infinite graphs. J. Algebra, 384:45–83, 2013.MathSciNetCrossRefMATH

142.

S. Paul Smith. Category equivalences involving graded modules over path algebras of quivers. Adv. Math., 230(4–6):1780–1810, 2012.MathSciNetCrossRefMATH

143.

S. Paul Smith. The space of Penrose tilings and the noncommutative curve with homogeneous coordinate ring \(k\langle x,y\rangle /(y^{2})\). J. Noncommut. Geom., 8(2):541–586, 2014.MathSciNetCrossRefMATH

144.

Benjamin Steinberg. A groupoid approach to discrete inverse semigroup algebras. Adv. Math., 223(2):689–727, 2010.MathSciNetCrossRefMATH

145.

Benjamin Steinberg. Simplicity, primitivity and semiprimitivity of étale groupoid algebras with applications to inverse semigroup algebras. J. Pure Appl. Algebra, 220(3):1035–1054, 2016.MathSciNetCrossRefMATH

148.

Mark Tomforde. Leavitt path algebras with coefficients in a commutative ring. J. Pure Appl. Algebra, 215(4):471–484, 2011.MathSciNetCrossRefMATH

Title: Generalizations, Applications, and Current Lines of Research
Authors: Gene Abrams
Pere Ara
Mercedes Siles Molina
Publisher: Springer London
Book: Leavitt Path Algebras
Print ISBN: 978-1-4471-7343-4

Electronic ISBN: 978-1-4471-7344-1

Copyright Year: 2017
DOI: https://doi.org/10.1007/978-1-4471-7344-1_7

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