By I. Madsen, B. Oliver

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**Additional info for Algebraic Topology Aarhus 1982. Proc. conf. Aarhus, 1982**

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ZHANG–Symplectic reduction and Family quantization. International Mathematics Research Notices, 19, 1999, pp 1043-1056.

Invent. Math. 132, 1998, p. 229–259. [40] Y. TIAN and W. ZHANG – Quantization formula for singular reduction. pr´epublication dg-ga/9706010 [41] Y. TIAN and W. ZHANG – Symplectic reduction and a weighted multiplicity formula for twisted SpinC -Dirac operators. Asian Journal of Mathematics 2, 1998, pp 591–608. [42] Y. TIAN and W. ZHANG – Holomorphic Morse inequalities in symplectic reduction. Math. Res. Lett 5, 1998, pp. 345–352. [43] Y. TIAN and W. ZHANG – Quantization formula for symplectic manifolds with boundary.

32] D. KIRWAN – Geometric invariant theory. 3d edition. -E. PARADAN – Localization of the Riemann-Roch character. DG/9911024, `a paraˆıtre dans Journal of Functional Analysis. DG/0103222, Soumis. raˆıtre. -E. DG/0103222, `a paraˆıtre. [35] R. SJAMAAR – Holomorphic slices, symplectic reduction and multiplicities of group representations. Annals of Mathematics, 1995, 141, pp 87–129. [36] R. SJAMAAR – Symplectic reduction and Riemann-Roch formulas for multiplicities. American Mathematical society Bulletin, 1996, 33, pp 327–338.