References
- Martínez C, Zelmanov E. Brackets, superalgebras and spectral gap. São Paulo J Math Sci. 2019;13(1):112–132.
- Hermann R. Yang-Mills, Kaluza-Klein, and the Einstein program. Interdisciplinary mathematics. Vol. XIX. Brookline (MA): Math Sci Press; 1978.
- Cantarini N, Kac V. Classification of linearly compact simple Jordan and generalized Poisson superalgebras. J Algebra. 2007;313(1):100–124.
- Kaygorodov I. Algebras of Jordan brackets and generalized poisson algebras. Lin Multilin Algebra. 2017;65(6):1142–1157.
- Agore AL, Militaru G. Extending structures. fundamentals and applications. Boca Raton (FL): CRC Press; 2020.
- Zusmanovich P. Low-dimensional cohomology of current lie algebras and analogs of the Riemann tensor for loop manifolds. Lin Algebra Appl. 2005;407:71–104. arXiv:math/0302334.
- Zusmanovich P. A compendium of Lie structures on tensor products. Zapiski Nauchnykh Seminarov POMI 2013;414:40–81. (N.A. Vavilov Festschrift), reprinted in J Math Sci. 2014;199(3):266–88. arXiv:1303.3231
- Eremita D. Biderivations on tensor products of algebras. Comm Algebra. 2018;46(4):1722–1726.
- Nakajima A. On categorical properties of generalized derivations. Sci Math. 1999;2(3):345–352.
- Kubo F. Lie structures on kx1,…,xn,y/(y3−3py−q). Bull Kyushu Inst Tech Math Natur Sci. 1988;35:1–6.
- Kostrikin AI, Dzhumadil'daev AS. Modular Lie algebras: new trends. In: Bahturin Yu, editor. Algebra. Proceeding of the International Algebraic Conference on the Occasion of the 90th Birthday of A.G. Kurosh; 1998 May 25–30; Moscow, Russia. Berlin: De Gruyter; 2000. p. 181–203.
- Laurent-Gengoux C, Pichereau A, Vanhaecke P. Poisson structures. Berlin: Springer; 2013.
- Kirillov AA. Local lie algebras. Uspekhi Mat Nauk. 1976;31(4):57–76. Erratum: 1977;32(1)267. (in Russian); Russ Math Surv. 1976;31(4):55–75 (English translation).
- The GAP Group. GAP – Groups, Algorithms, and Programming. Version 4.10.2, 2019. Available from: https://www.gap-system.org/