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Zapiski Nauchnykh Seminarov POMI, 2019, Volume 485, Pages 155–175
(Mi znsl6874)
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Parametrization of the conjugacy class of the special linear group
Yu. Palijab a Institute of Applied Physics Academy of Sciences of Moldova, Kishinev
b Joint Institute for Nuclear Research, Laboratory of Information Technologies
Abstract:
Local description of the foliation of the group ${SL}(n)$ into the conjugacy classes, and also the foliation ${\mathfrak{sl}^*(n)}$ into the coadjoint orbits, requires the introducing of parameters on the conjugacy class (the coadjoint orbit). Under the assumption that the parameters are rational functions of natural coordinates (the matrix elements) on ${SL}(n)$, the problem is reduced to solving a system of linear equations. Such a system arises from the requirement of parameter invariance with respect to shifts along vector fields normal to the conjugacy class. Likewise, the problem of parameterization of coadjoint orbits in ${\mathfrak{sl}^*(n)}$ can be treated with the use of the Cartan–Weyl basis for ${\mathfrak{sl}(n)}$. The adjoint action is the differential of the conjugacy action. As a consequence, the parameters on the conjugacy classes and coadjoint orbits are related by the transformation specified by the mapping of the algebra ${\mathfrak{sl}(n)}$ into the group ${SL}(n)$. The groups ${SL}(3), {SL}(4)$ are considered as examples.
Key words and phrases:
Lie group, Lie algebra, conjugacy class, coadjoint orbit, foliation, Lie derivative, invariants.
Received: 26.09.2019
Citation:
Yu. Palij, “Parametrization of the conjugacy class of the special linear group”, Representation theory, dynamical systems, combinatorial methods. Part XXXI, Zap. Nauchn. Sem. POMI, 485, POMI, St. Petersburg, 2019, 155–175
Linking options:
https://www.mathnet.ru/eng/znsl6874 https://www.mathnet.ru/eng/znsl/v485/p155
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Abstract page: | 107 | Full-text PDF : | 42 | References: | 17 |
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