Faculty
Essential Information
Name:Qin LI
Position:Associate Researcher
Highest Degree:Doctor of Philosophy in Mathematics
Email:liqin@sustech.edu.cn
Research Field:Mathematical foundation of Quantum Field Theory
Educational Background
2001-2005, University of Science and Technology of China, B.S. in Mathematics , USTC, July 2005
2005-2011, University of California at Berkeley, Ph.D. in Mathematics, UC Berkeley, May 2011
Working Experience
2011.9-2015.7, School of Mathematical Sciences, University of Science and Technology of China, Assistant Professor
2013.6-2015.7, Department of Mathematics, The Chinese University of Hong Kong, Postdoctoral fellow
2015.7-2021.9, Department of Mathematics, Southern University of Science and Technology, Assistant Professor
2021.10- present, Institute for Quantum Sciences, Southern University of Science and Technology, Associate Researcher
Papers and Patents
(1). “Bargmann-Fock sheaves on Kähler manifolds”, Communications in Mathematical Physics 388 (2021), no. 3, 1297–1322.
(2). “Quantization of Kähler manifolds”, Journal of Geometry and Physics, 163 (2021), 104143, 13 pp
(3). “One-dimensional Chern-Simons theory and deformation quantization”, accepted by ICCM Pro-ceedings 2018.
(4) . “BV quantization of the Rozansky-Witten model”, Communications in Mathematical Physics 355(2017), 97-144.
(5). “Batalin-Vilkovisky quantization and the algebraic index”, Advances in Mathematics 317 (2017), 575-639.
(6). “On the B-twisted topological sigma model and Calabi-Yau geometry”, Journal of Differential Geometry 102 (2016), no. 3, 409-484.
(7). “Cardy algebras and sewing constraints, II” Advances in Mathematics 262 (2014), 604-681.
(8). “On the B-twisted quantum geometry of Calabi-Yau manifolds”, Proceedings of ICCM 2013
(9). “A geometric construction of representations of the Berezin-Toeplitz quantization”, submitted to Advances in Theoretical and Mathematical Physics, available at arXiv:2001.10869.
(10). “Kapranov’s L∞ structures, Fedosov’s star products, and one-loop exact BV quantizations on Kähler manifolds”, submitted to Communications in Number Theory and Physics, available at arXiv:2008.07057.