Dual Coalgebras of Jordan Bialgebras and Superalgebras |
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| Authors: | V. N. Zhelyabin |
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| Affiliation: | (1) Sobolev Institute of Mathematics, Novosibirsk, Russia |
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| Abstract: | ![]()
W. Michaelis showed for Lie bialgebras that the dual coalgebra of a Lie algebra is a Lie bialgebra. In the present article we study an analogous question in the case of Jordan bialgebras. We prove that a simple infinite-dimensional Jordan superalgebra of vector type possesses a nonzero dual coalgebra. Thereby, we demonstrate that the hypothesis formulated by W. Michaelis for Lie coalgebras fails in the case of Jordan supercoalgebras. |
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| Keywords: | Hopf algebra Lie bialgebra Jordan bialgebra Jordan superalgebra nonassociative coalgebra local finite dimensionality dual coalgebra |
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