Double quantization on coadjoint representations of simple Lie groups and its orbits
Abstract
Let M be a manifold with an action of a Lie group G, the function algebra on M. The first problem we consider is to construct a Uh() invariant quantization, h, of , where Uh() is a quantum group corresponding to G. Let s be a G invariant Poisson bracket on M. The second problem we consider is to construct a Uh() invariant two parameter (double) quantization, t,h, of such that t,0 is a G invariant quantization of s. We call t,h a Uh() invariant quantization of the Poisson bracket s. In the paper we study the cases when G is a simple Lie group and M is the coadjoint representation * of G or a semisimple orbit in this representation. The paper is founded on the papers: J.Donin, Double quantization on the coadjoint representation of sl(n)*, Czechoslovak J. of Physics, 47 (1997), no 11, 1115-1122, q-alg/9707031, and J.Donin, D.Gurevich, and S.Shnider, Double Quantization on Some Orbits in the Coadjoint Representations of Simple Lie Groups, Com. Math. Phys., 204 (1999), no. 1, 39-60, math/9807159, and contains some additional results.
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