A construction of representations and quantum homogeneous spaces (Q1283207)

Let \(G\) be a simple and simply connected Lie group of type \(A_{\ell }\), \( B_{\ell }\), \(C_{\ell }\), or \(D_{\ell }\), and \(K\) be its maximal compact subgroup. The author first recalls Kirillov and Kostant's orbit method in constructing representations of \(K\) on local holomorphic (or anti-holomorphic) functions on the coadjoint orbit \(X=K_{0}\backslash K=P_{0}\backslash G\) of \(K\). Then with this as a motivation, the author presents a construction of representations of the quantized enveloping algebra \(\mathcal{U}_{q}\left( \mathfrak{g}\right) \), for the simple complex Lie algebra \(\mathfrak{g}\) of type \(A_{\ell }\), \(B_{\ell }\), \(C_{\ell }\), or \( D_{\ell }\), on the quantized algebra of anti-holomorphic polynomial functions on the big cell of a coadjoint orbit \(X\) of \(K\).