Quantizing the Moduli Space of Parabolic Higgs Bundles
Reference14 articles.
1. [1] F. Bayern, M. Flato, C. Frondsal, A. Lichnerowicz, D. Sternheimer, Deformation Theory and Quantizations I, II. Ann. Phys.
111 (1978) 61–151; B. V. Fedosov, A simple geometrical construction of deformation quantization, J. Differntial Geom., 40 (1994) 213–238 A Weinstein, Deformation Quantization, Séminaire Bourbaki
46 (789), (1994), 213–238. 2. [2] A Beauville, Variétés Kähleriennes dont la premi`ere class de Chern est nulle, J. Differential Geom
18 (1983) 755–782. 3. [3] D. Ben-Zvi and I. Biswas, A Quantization on Riemann surfaces with projective structure, Lett. Math. Phys
54, (2000), 73–82. 4. [4] Bradlow, S., García-Prada, O.: Stable triples, equivariant bundles and dimension reduction. Math. Ann. 304, 225–252 (1996) 5. [5] Biswas, I., Mukherjee, A.: Quantization of a Moduli Space of Parabolic Higgs Bundles, Int. J. Mathematics, . 15, (2004) 907–917.
|
|