Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
Axial view on pseudo-composition algebras and train algebras of rank 3. / Gorshkov, I.; Mamontov, A.; Staroletov, A.
в: International Journal of Algebra and Computation, Том 34, № 6, 01.09.2024, стр. 937-960.Результаты исследований: Научные публикации в периодических изданиях › статья › Рецензирование
}
TY - JOUR
T1 - Axial view on pseudo-composition algebras and train algebras of rank 3
AU - Gorshkov, I.
AU - Mamontov, A.
AU - Staroletov, A.
N1 - Export Date: 19 October 2024 Адрес для корреспонденции: Gorshkov, I.; Sobolev Institute of Mathematics, Russian Federation; эл. почта: ilygor8@gmail.com Сведения о финансировании: Russian Science Foundation, RSF, 22-11-00081 Сведения о финансировании: FWNF-2022-0002 Текст о финансировании 1: We would like to thank Prof. Sergey Shpectorov for useful comments on an earlier draft of this paper. We also thank the referee for helpful comments that improved the quality of this paper. Ilya Gorshkov and Andrey Mamontov are supported by the Russian Scientific Foundation (Project No. 22-11-00081, https://rscf.ru/en/project/22-11-00081/) and Alexey Staroletov is supported by the RAS Fundamental Research Program (Project FWNF-2022-0002).
PY - 2024/9/1
Y1 - 2024/9/1
N2 - We show that pseudo-composition algebras and train algebras of rank 3 generated by idempotents are characterized as axial algebras with fusion laws derived from the Peirce decompositions of idempotents in these classes of algebras. The corresponding axial algebras are called PC(η)-axial algebras, where η is an element of the ground field. As a first step toward their classification, we describe the 2- and 3-generated subalgebras of such algebras. © World Scientific Publishing Company.
AB - We show that pseudo-composition algebras and train algebras of rank 3 generated by idempotents are characterized as axial algebras with fusion laws derived from the Peirce decompositions of idempotents in these classes of algebras. The corresponding axial algebras are called PC(η)-axial algebras, where η is an element of the ground field. As a first step toward their classification, we describe the 2- and 3-generated subalgebras of such algebras. © World Scientific Publishing Company.
KW - axial algebra
KW - idempotent
KW - Peirce decomposition
KW - Pseudo-composition algebra
KW - train algebra
UR - https://www.mendeley.com/catalogue/200ed256-2ba0-3921-8cff-53b526347bc0/
U2 - 10.1142/S0218196724500383
DO - 10.1142/S0218196724500383
M3 - статья
VL - 34
SP - 937
EP - 960
JO - International Journal of Algebra and Computation
JF - International Journal of Algebra and Computation
SN - 0218-1967
IS - 6
ER -
ID: 126390230