Super Poisson-Lie structure on $SU(m\ve n)$ via $SL(m\ve n,\C)^{\R}$

Details Super Poisson-Lie structure on $SU(m\ve n)$ via $SL(m\ve n,\C)^{\R}$ Super Poisson-Lie structure on $SU(m\ve n)$ via $SL(m\ve n,\C)^{\R}$

2005-12-06

arxiv.org/abs/math/0512130v1

Mathematics

Symplectic Geometry

Scientific paper

This paper concerns a super Poisson-Lie structure on the real Lie supergroup $SU(m \ve n)$. In fact, it turns out that the realification of the complex Lie supergroup $SL(m \ve n, \C)$ is a double of $SU(m \ve n)$ i.e. it is endowed with a structure of super Poisson-Lie which brings down on the supergroup $SU(m \ve n)$. We show that the dual Poisson-Lie supergroup of $SU(m\ve n)$ is $s(AN)$. Reciprocaly, $s(AN)$ inherits a super Poisson-Lie structure from the realification of $SL(m\ve n,\C)$ such that its dual Poisson-Lie supergroup is $SU(m\ve n)$.

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