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Communications in Algebra Volume 47, 2019 - Issue 4
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Original Articles

Extending structures of lie conformal superalgebras

Jun ZhaoSchool of Mathematics and Statistics, Northeast Normal University, Changchun, China; View further author information
,
Liangyun ChenSchool of Mathematics and Statistics, Northeast Normal University, Changchun, China; View further author information
&
Lamei YuanDepartment of Mathematics, Harbin Institute of Technology, Harbin, ChinaCorrespondence[email protected]
View further author information
Pages 1541-1555 | Received 20 Jan 2018, Accepted 24 Jul 2018, Published online: 22 Feb 2019

References

  • Agore, A., Militaru, G. (2013). Unified products for leibniz algebras. Linear Algebra Appl. 439(9):2609–2633.
  • Agore, A., Militaru, G. (2014). Extending structures for lie algebras. Monatsh. Math. 174(2):169–193.
  • Boyallian, C., Kac, V., Liberati, J. (2013). Classification of finite irreducible modules over the lie conformal superalgebra CK6. Commun. Math. Phys. 317(2):503–546.
  • Boyallian, C., Kac, V., Liberati, J., Rudakov, A. (2006). Representations of simple finite lie conformal superalgebras of type W and S. J. Math. Phys. 47(4):043513–043525.
  • Chang, Z. (2013). Automorphisms and twisted forms of differential Lie conformal superalgebras. Thesis (Ph.D.)-University of Alberta, Canada.
  • Chang, Z. (2015). The automorphism group functor of the N = 4 lie conformal superalgebra. Commun. Algebra 43(11):4900–4915.
  • Fattori, D., Kac, V. (2002). Classification of finite simple lie conformal superalgebras. J. Algebra 258(1):23–59.
  • Fattori, D., Kac, V., Retakh, A. (2004). Structure theory of finite lie conformal superalgebras. In: Doebner, H.-D., Dobrev, V. K., eds. Lie Theory and Its Applications in Physics V. River Edge, NJ: World Scientific Publishing.
  • Hong, Y. (2016). A class of lie conformal superalgebras in higher dimensions. J. Lie Theor. 26:1145–1162.
  • Hong, Y., Su, Y. (2017). Extending structures for lie conformal algebras. Algebr. Represent. Theor. 20(1):209–230.
  • Kolesnikov, P. (2008). Universally defined representations of lie conformal superalgebras. J. Symbolic Comput. 43(6–7):406–421.

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