Lie Bialgebra Structures on the Lie Algebra <inline-formula><math display="inline"><semantics><mi mathvariant="fraktur">L</mi></semantics></math></inline-formula> Related to the Virasoro Algebra

Xue Chen; Yihong Su; Jia Zheng

doi:10.3390/sym15010239

Symmetry (Jan 2023)

Lie Bialgebra Structures on the Lie Algebra <inline-formula><math display="inline"><semantics><mi mathvariant="fraktur">L</mi></semantics></math></inline-formula> Related to the Virasoro Algebra

Xue Chen,
Yihong Su,
Jia Zheng

Affiliations

Xue Chen: School of Mathematics and Statistics, Xiamen University of Technology, Xiamen 361024, China
Yihong Su: School of Mathematics and Statistics, Xiamen University of Technology, Xiamen 361024, China
Jia Zheng: School of Mathematics and Statistics, Xiamen University of Technology, Xiamen 361024, China

DOI: https://doi.org/10.3390/sym15010239
Journal volume & issue: Vol. 15, no. 1
p. 239

Abstract

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A Lie bialgebra is a vector space endowed simultaneously with the structure of a Lie algebra and the structure of a Lie coalgebra, and some compatibility condition. Moreover, Lie brackets have skew symmetry. Because of the close relation between Lie bialgebras and quantum groups, it is interesting to consider the Lie bialgebra structures on the Lie algebra L related to the Virasoro algebra. In this paper, the Lie bialgebras on L are investigated by computing Der(L, L⊗L). It is proved that all such Lie bialgebras are triangular coboundary, and the first cohomology group H1(L, L⊗L) is trivial.

Published in Symmetry

ISSN: 2073-8994 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/symmetry/

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