By Hugo Hadwiger

Hadwiger H., Debrunner H. Combinatorial geometry within the airplane (Holt, 1966)(ISBN 0249790114)

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45] M. VERGNE – Multiplicities formulas for geometric quantization. part I and II Duke Math. Journal 82, 1996, pp 143–179, 181–194 [46] E. WITTEN – Two dimensional gauge theories revisited. J. Geom. Phys. 9, 1992, pp 303–368 [47] C. WOODWARD – The classification of transversal multiplicity-free group actions. Annals of Global Analysis and Geometry, 1996, 14, pp 3–42. 888-31 [48] S. WU –A note on higher cohomology groups of K¨ahler quotients. Annals of Global Analysis and Geometry, 2000, 18, pp 569–576.

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. [37] R. SJAMAAR and E. LERMAN – Stratified symplectic spaces and reduction. Annals of Mathematics, 1991, 134, pp 375–422. [38] C. TELEMAN – The quantization conjecture revisited. Ann. of Math. 152, 2000, pp 1-43.

Math. Res. Lett 5, 1998, pp. 345–352. [43] Y. TIAN and W. ZHANG – Quantization formula for symplectic manifolds with boundary. Geom. funct. anal 9, 1999, pp. 596–640. [44] M. VERGNE – Equivariant index formulas for orbifolds. Duke Math. Journal, 82, 1996, pp 637–652. [45] M. VERGNE – Multiplicities formulas for geometric quantization. part I and II Duke Math. Journal 82, 1996, pp 143–179, 181–194 [46] E. WITTEN – Two dimensional gauge theories revisited. J. Geom. Phys. 9, 1992, pp 303–368 [47] C.