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Communications in Algebra Volume 31, 2003 - Issue 11
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Original Articles

A Classification of Low Dimensional Lie Bialgebras

Quanqin Jin Department of Applied Mathematics, Tongji University, Shanghai, P. R. China; Department of Applied Mathematics, Tongji University, Shanghai, 200092, P. R. ChinaCorrespondence[email protected]
Pages 5481-5499 | Received 01 Apr 2002, Published online: 31 Aug 2006

References

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  • De Smedt , V. 1994 . Existence of a Lie bialgebra structure on every Lie algebra . Lett. Math. Phys. , 31 : 225 – 231 .
  • Drinfeld , V. G. Proceedings of International Congress on Mathematics . 1986 , Berkeley. Quantum groups , pp. 798 – 820 . Providence, RI : Amer. Math. Soc. .
  • Feldvoss , J. 1999 . Existence of triangular lie bialgeras structures . J. Pure App. Algebra , 134 : 1 – 14 .
  • Jacobson , N. 1962 . Lie Algebras New York : Interscience-Wiley .
  • Michaelis , W. 1980 . Lie coalgebra . Adv. Math. , 38 : 1 – 54 .
  • Yang , C. N. and Ge , M. L. 1989 . Braid Groups, Knot Theory and Statistical Mechanics Singapore : World Scientific .
  • Zhang , S. 1998 . Classical Yang-Baxter equation and low dimensional triangular Lie bialgebras . Phys. Lett. A , 246 : 71 – 81 .

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