Abstract
In the paper, the speciality of Jordan superalgebras corresponding to Novikov-Poisson algebras is proved.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
I. L. Kantor, “Jordan and Lie superalgebras determined by a Poisson algebra,” in Algebra and Analysis (Izd. TGU, Tomsk, 1989), pp. 55–80 [Algebra and Analysis, Amer. Math. Soc. Transl. Ser. 2, Vol. 151 (AmericanMathematical Society, Providence, RI, 1992), pp. 55–80].
D. King and K. McCrimmon, “The Kantor construction of Jordan superalgebras,” Comm. Algebra 20 (1), 109–126 (1992).
I. P. Shestakov, “Superalgebras and counterexamples,” Sibirsk. Mat. Zh. 32 (6), 187–196 (1991) [Siberian Math. J. 32 (6), 1052–1060 (1991) (1992)].
K. McCrimmon, “Speciality and nonspeciality of two Jordan superalgebras,” J. Algebra 149 (2), 326–351 (1992).
V. G. Skosyrskii, “Prime Jordan algebras and the Kantor construction,” Algebra Logika 33 (3), 301–306 (1994) [Algebra Logic 33 (3), 169–179 (1994) (1995)].
I. P. Shestakov, “Quantization of Poisson algebras and weak speciality of related Jordan superalgebras,” Dokl. Ross. Akad. Nauk 334 (1), 29–31 (1994) [Dokl.Math. 49 (1), 34–37 (1994)].
I. P. Shestakov, “Quantization of Poisson superalgebras and the specialty of Jordan superalgebras of Poisson type,” Algebra Logika 32 (5), 571–584 (1993) [Algebra Logic 32 (5), 309–317 (1993) (1994)].
C. Martínez, I. Shestakov and E. Zelmanov, “Jordan superalgebras defined by brackets,” J. London Math. Soc. (2) 64 (2), 357–368 (2001).
I. Shestakov, “On speciality of Jordan brackets,” Algebra DiscreteMath., No. 3, 94–101 (2009).
I. M. Gelfand and I. Ya. Dorfman, “Hamiltonian operators and algebraic structures associated with them,” Funktsional. Anal. Prilozhen. 13 (4), 13–30 (1979) [Functional Anal. Appl. 13 (4), 248–262 (1979)].
A. A. Balinskii and S. P. Novikov, “Poisson brackets of hydrodynamic type, Frobenius algebras and Lie algebras,” Dokl. Akad. Nauk SSSR 283 (5), 1036–1039 (1985) [Soviet Math. Dokl. 32 (1), 228–231 (1985)].
E. I. Zel’manov, “A class of local translation-invariant Lie algebras,” Dokl. Akad. Nauk SSSR 292 (6), 1294–1297 (1987) [SovietMath. Dokl. 35 (6), 216–218 (1987)].
V. T. Filippov, “A class of simple nonassociative algebras,” Mat. Zametki 45 (1), 101–105 (1989) [Math. Notes 45 (1), 68–71 (1989)].
J.M. Osborn, “Modules for Novikov algebras,” in Second International Conference on Algebra, Contemp. Math., Barnaul, 1991 (Amer. Math. Soc., Providence, RI, 1995), Vol. 184, pp. 327–338.
J.M. Osborn, “Novikov algebras,” Nova J. Algebra Geom. 1 (1), 1–13 (1992).
J.M. Osborn, “Simple Novikov algebra with an idempotent,” Comm. Algebra 20 (9), 2729–2753 (1992).
X. Xu, “Classification of simple Novikov algebra and their irreduciblemodules of characterestic 0,” J. Algebra 246 (2), 673–707 (2001).
X. Xu, “Novikov–Poisson algebra,” J. Algebra 190 (2), 253–279 (1997).
X. Xu, “On simple Novikov algebras and their irreduciblemodules,” J. Algebra 185 (3), 905–934 (1996).
A. S. Tikhov, “Novikov–Poisson algebras and Jordan superalgebras,” in Problems of Theoretical and Applied Mathematics (Institute of Mathematics and Mechanics, Ural Branch of the Russian Academy of Sciences, Ekaterinburg, 2006), pp. 76–79 [in Russian].
V. N. Zhelyabin and A. S. Tikhov, “Novikov–Poisson algebras and associative commutative derivation algebras,” Algebra Logika 47 (2), 186–202 (2008) [Algebra Logic 47 (2), 107–117 (2008)].
A. S. Zakharov, “Novikov–Poisson algebras and superalgebras of Jordan brackets,” Comm. Algebra 42 (5), 2285–2298 (2014).
A. S. Zakharov, “Embedding Novikov–Poisson algebras in Novikov–Poisson algebras of vector type,” Algebra Logika 52 (3), 352–369 (2013) [Algebra Logic 52 (3), 236–249 (2013)].
I. P. Shestakov, “Simple (-1, 1)-superalgebras,” Algebra Logika 37 (6), 721–739 (1998) [Algebra Logic 37 (6), 411–422 (1998)].
Author information
Authors and Affiliations
Corresponding author
Rights and permissions
About this article
Cite this article
Zhelyabin, V.N., Zakharov, A.S. Speciality of Jordan superalgebras related to Novikov-Poisson algebras. Math Notes 97, 341–348 (2015). https://doi.org/10.1134/S0001434615030050
Received:
Accepted:
Published:
Issue Date:
DOI: https://doi.org/10.1134/S0001434615030050