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Homogeneous algebras via homogeneous triples. / Marcos, E.; Volkov, Y.

In: Journal of Algebra, Vol. 566, 15.01.2021, p. 259-282.

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Harvard

Marcos, E & Volkov, Y 2021, 'Homogeneous algebras via homogeneous triples', Journal of Algebra, vol. 566, pp. 259-282. https://doi.org/10.1016/j.jalgebra.2020.09.012

APA

Marcos, E., & Volkov, Y. (2021). Homogeneous algebras via homogeneous triples. Journal of Algebra, 566, 259-282. https://doi.org/10.1016/j.jalgebra.2020.09.012

Vancouver

Marcos E, Volkov Y. Homogeneous algebras via homogeneous triples. Journal of Algebra. 2021 Jan 15;566:259-282. https://doi.org/10.1016/j.jalgebra.2020.09.012

Author

Marcos, E. ; Volkov, Y. / Homogeneous algebras via homogeneous triples. In: Journal of Algebra. 2021 ; Vol. 566. pp. 259-282.

BibTeX

@article{deae8e34626c48b081f288063238750a,
title = "Homogeneous algebras via homogeneous triples",
abstract = "To study s-homogeneous algebras, we introduce the category of quivers with s-homogeneous corelations and the category of s-homogeneous triples. We show that both of these categories are equivalent to the category of s-homogeneous algebras. We prove some properties of the elements of s-homogeneous triples and give some consequences for s-Koszul algebras. Then we discuss the relations between the s-Koszulity and the Hilbert series of s-homogeneous triples. We give some application of the obtained results to s-homogeneous algebras with simple zero component. We describe all s-Koszul algebras with one relation recovering the result of Berger and all s-Koszul algebras with one dimensional s-th component. We show that if the s-th Veronese ring of an s-homogeneous algebra has two generators, then it has at least two relations. Finally, we classify all s-homogeneous algebras with s-th Veronese rings k〈x,y〉/(xy,yx) and k〈x,y〉/(x2,y2). In particular, we show that all of these algebras are not s-Koszul while their s-homogeneous duals are s-Koszul.",
keywords = "s-homogeneous algebra, s-Koszul algebras, Veronese ring",
author = "E. Marcos and Y. Volkov",
note = "Publisher Copyright: {\textcopyright} 2020 Elsevier Inc.",
year = "2021",
month = jan,
day = "15",
doi = "10.1016/j.jalgebra.2020.09.012",
language = "English",
volume = "566",
pages = "259--282",
journal = "Journal of Algebra",
issn = "0021-8693",
publisher = "Elsevier",

}

RIS

TY - JOUR

T1 - Homogeneous algebras via homogeneous triples

AU - Marcos, E.

AU - Volkov, Y.

N1 - Publisher Copyright: © 2020 Elsevier Inc.

PY - 2021/1/15

Y1 - 2021/1/15

N2 - To study s-homogeneous algebras, we introduce the category of quivers with s-homogeneous corelations and the category of s-homogeneous triples. We show that both of these categories are equivalent to the category of s-homogeneous algebras. We prove some properties of the elements of s-homogeneous triples and give some consequences for s-Koszul algebras. Then we discuss the relations between the s-Koszulity and the Hilbert series of s-homogeneous triples. We give some application of the obtained results to s-homogeneous algebras with simple zero component. We describe all s-Koszul algebras with one relation recovering the result of Berger and all s-Koszul algebras with one dimensional s-th component. We show that if the s-th Veronese ring of an s-homogeneous algebra has two generators, then it has at least two relations. Finally, we classify all s-homogeneous algebras with s-th Veronese rings k〈x,y〉/(xy,yx) and k〈x,y〉/(x2,y2). In particular, we show that all of these algebras are not s-Koszul while their s-homogeneous duals are s-Koszul.

AB - To study s-homogeneous algebras, we introduce the category of quivers with s-homogeneous corelations and the category of s-homogeneous triples. We show that both of these categories are equivalent to the category of s-homogeneous algebras. We prove some properties of the elements of s-homogeneous triples and give some consequences for s-Koszul algebras. Then we discuss the relations between the s-Koszulity and the Hilbert series of s-homogeneous triples. We give some application of the obtained results to s-homogeneous algebras with simple zero component. We describe all s-Koszul algebras with one relation recovering the result of Berger and all s-Koszul algebras with one dimensional s-th component. We show that if the s-th Veronese ring of an s-homogeneous algebra has two generators, then it has at least two relations. Finally, we classify all s-homogeneous algebras with s-th Veronese rings k〈x,y〉/(xy,yx) and k〈x,y〉/(x2,y2). In particular, we show that all of these algebras are not s-Koszul while their s-homogeneous duals are s-Koszul.

KW - s-homogeneous algebra

KW - s-Koszul algebras

KW - Veronese ring

UR - http://www.scopus.com/inward/record.url?scp=85091066685&partnerID=8YFLogxK

U2 - 10.1016/j.jalgebra.2020.09.012

DO - 10.1016/j.jalgebra.2020.09.012

M3 - Article

AN - SCOPUS:85091066685

VL - 566

SP - 259

EP - 282

JO - Journal of Algebra

JF - Journal of Algebra

SN - 0021-8693

ER -

ID: 100812387