References
- Bayen, F., Flato, M., Fronsdal, C., Lichnerowicz, A., Sternheimer, D. (1978). Deformation theory and quantization. II. Physical applications. Ann. Phys. 111(1):111–151. DOI: 10.1016/0003-4916(78)90225-7.
- Benayadi, S., Chopp, M. (2011). Lie-admissible structures on Witt type algebras. J. Geom. Phys. 61(2):541–559. DOI: 10.1016/j.geomphys.2010.10.018.
- Goze, M., Remm, E. (2004). Lie-admissible algebras and operads. J. Algebra 273(1):129–152. DOI: 10.1016/j.jalgebra.2003.10.015.
- Goze, M., Remm, E. (2007). A class of nonassociative algebras. Algebra Colloq. 14(02):313–326. DOI: 10.1142/S1005386707000314.
- Goze, M., Remm, E. (2008). Elisabeth Poisson algebras in terms of non-associative algebras. J. Algebra 320(1):294–317. DOI: 10.1016/j.jalgebra.2008.01.024.
- Kontsevich, M. (2003). Deformation quantization of Poisson manifolds. Lett. Math. Phys. 66(3):157–216. DOI: 10.1023/B:MATH.0000027508.00421.bf.
- Makarenko, N. Y. (2015). Lie type algebras with an automorphism of finite order. J. Algebra 439:33–66. DOI: 10.1016/j.jalgebra.2015.04.033.
- Markl, M., Remm, E. Algebras with one operation including Poisson and other Lie-admissible algebras. J. Algebra 299(1):171–189.
- Remm, E. (2012). Associative and Lie deformations of Poisson algebras. Commun. Math. 20(2):117–136.
- Remm, E., Goze, M. (2015). A class of nonassociative algebras including flexible and alternative algebras, operads and deformations. J. Gen. Lie Theory Appl. 9:2. DOI: 10.4172/1736-4337.1000235.