References
- Drinfel’d, V. G. (1983). Hamiltonian structures on Lie groups, Lie bialgebras and the geometric meaning of classical Yang-Baxter equations. Dokl. Akad. Nauk SSSR. 268(2):285–287.
- Drinfel’d, V. G. (1987). Quantum groups. Presented at Proceedings of ICM, Berkeley, 1986. AMS, Providence, RI, pp. 798–820.
- Hartwig, J., Larsson, D., Silvestrov, S. (2006). Deformations of lie algebras using σ-derivations. J. Algebra. 295(2):314–361.
- Ammar, F., Makhlouf, A. (2010). Hom-Lie superalgebras and Hom-Lie admissible superalgebras. J. Algebra. 324(7):1513–1528.
- Yau, D., The, C. (2015). Hom-Yang-Baxter equation and Hom-Lie bialgebras. Int. Electr. J. Algebra. 17(17):11–45.
- Sheng, Y., Bai, C. (2014). A new approach to Hom-Lie bialgebras. J. Algebra. 399:232–250.
- Cai, L., Sheng, Y. (2018). Purely Hom-Lie Bialgebras. Sci. China Math. DOI:10.1007/s11425-016-9102-y.
- Andruskiewitsch, N. (1993). Lie superbialgebras and Poisson-Lie supergroups. Abhmathseminunivhambg. 63(1):147–163.
- Hengyun, Y., Yucai, S. (2010). Lie superbialgebra structures on generalized super-virasoro algebras. Acta Math. Sci. 30(1):225–239.
- Makhlouf, A., Silvestrov, S. (2010). Hom-algebras and Hom-coalgebras. J. Algebra Appl. 9(4):1–37.
- Michaelis, W. (1980). Lie coalgebras. Adv. Math. 38(1):1–54.
- Makhlouf, A., Silvestrov, S. (2010). Notes on 1-parameter formal deformations of Hom-associative and Hom-Lie algebras. Forum Math. 22:715–739.
- Yau, D. (2009). Hom-algebras and homology. J. Lie Theory. 19(2):409–421.
- Larsson, D., Silvestrov, S. (2005). Quasi-hom-lie algebras, central extensions and 2-cocycle-like identities. J. Algebra. 288(2):321–344.
- Drinfel’d, V. G. (1983) Constant quasiclassical solution of the Yang-Baxter quantum equation. Sov. Math. Dokl. 28:667–671.
- Drinfel'd, V. G. (1992). Structure of the quasitriangular quasi-hopf algebras. Funct. Anal. Appl. 26(1):63–65.
- Ammar, F., Makhlouf, A., Saadaoui, N. (2013). Cohomology of Hom-Lie superalgebras and q-deformed with superalgebra. Czech. Math. J. 63(3):721–761.
- Drinfel’d, V. G. (1990). Quasi-Hopf algebras. Leningrad Math. J. 1(6):1419–1457.
- Benayadi, S., Makhlouf, A. (2014). Hom-Lie algebras with symmetric invariant nondegenerate bilinear forms. J. Geom. Phys. 76:38–60.
- Drinfel’d, V. G. (1989). Quasi-Hopf algebras and Knizhnik-Zamolodchikov equation. In: Klimyk, A.U., ed. Problems of Modern Quantum Field Theory. Berlin: Springer, pp. 1–13.
- Larsson, D., Silvestrov, S. (2005). Quasi-Lie algebras. Contemp. Math. 391:241–248.
- Majid, S. (1995). Foundation of Quantum Group Theory. Cambridge, UK: Cambridge University Press.
- Makhlouf, A. (2010). Paradigm of nonassociative Hom-algebras and Hom-superalgebras. Presented at the Proceedings of Jordan Structures in Algebra and Analysis Meeting, Editorial Circulo Rojo, Almeria, pp. 143–177.
- Makhlouf, A., Silvestrov, S. (2008). Hom-algebra structures. J. Gen. Lie Theory Appl. 2(2):51–64.
- Makhlouf, A., Yau, D. (2014). Rota-Baxter Hom-Lie-admissible algebras. Comm. Algebra. 42(3):1231–1257.
- Sheng, Y. (2012). Representation of Hom-Lie algebras. Algebr. Represent. Theor. 15(6):1081–1098.
- Yau, D. (2008). Enveloping algebras of Hom-Lie algebras. J. Gen. Lie Theory Appl. 2(2):95–108.