Method of quantum characters in equivariant quantization
Abstract
Let G be a reductive Lie group, its Lie algebra, and M a G-manifold. Suppose h(M) is a h()-equivariant quantization of the function algebra (M) on M. We develop a method of building h()-equivariant quantization on G-orbits in M as quotients of h(M). We are concerned with those quantizations that may be simultaneously represented as subalgebras in *h() and quotients of h(M). It turns out that they are in one-to-one correspondence with characters of the algebra h(M). We specialize our approach to the situation =gl(n,), M=(n), and h(M) the so-called reflection equation algebra associated with the representation of h() on n. For this particular case, we present in an explicit form all possible quantizations of this type; they cover symmetric and bisymmetric orbits. We build a two-parameter deformation family and obtain, as a limit case, the ()-equivariant quantization of the Kirillov-Kostant-Souriau bracket on symmetric orbits.
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