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Name | Fuquan Fang |
Status | Ph D., Chair Professor of Mathematics | |
Research interests | Algebraic Topology, Geometric Topology Differential and metric Geometry | |
Address |
105 West Third Ring Road North, Haidian District, Beijing, 100048 China. Email:fuquan_fang@yahoo.com |
He is currently an Editorial Advisor for the London Mathematical Society journals ( the Journal, Transactions, and Bulletin). He is happy to receive submissions in the areas of his interests. He currently also serve on the editorial board of the journals: Differential Geometry and its Applications, Frontiers of Mathematics in China, Sciences China Mathematics etc.
ICM, Seoul, 2014 | Invited Speaker (Geometry Section) |
2014 | National Natural Science Award of China |
1998 | Qiu-Shi Awards, Hong-Kong |
Delegate to the 13th National People's Congress |
Member of 11th,12th, 13thBeijing Municipal People's Political Consultative Conference |
Vice President, Capital Normal University, 2016-2019 |
Dean, School of Math. Sciences, 2014-2018 |
Director, Academy for Multidisciplinary Sciences, Capital Normal University, 2019- |
Science Fund for Creative Research Groups of NSFC,2019-2023 |
Innovative Research Team of Ministry of Education, China, 2011-2014 |
The Key Programs of NSFC, 2012-2015; 2016-2019 |
Fok Ying-Tong Education Foundation for Young Teachers of China, 2002 |
Distinguished Young Scholars of NSFC, 1999-2002 |
[1] F. Fang, K. Grove, G. Thorbergsson, Tits geometry and positive curvature | Acta Math., 218 (2017), 1–53 |
[2] J. F. Davis, F. Fang, An almost flat manifold with a cyclic or quaternionic holonomy group bounds | J. Differential Geom., 103 (2016), 289–296 |
[3] F. Fang, K. Grove, Reflection groups in non-negative curvature | J. Differential Geom., 102 (2016), 179–205 |
[4] F. Fang, Non-negatively curved manifolds and Tits geometry | Proceedings of the International Congress of Mathematicians—Seoul 2014, Vol. II, 867–880, Kyung Moon Sa, Seoul, 2014 |
[5] F. Fang, X. Rong, The second twisted Betti number and the convergence of collapsing Riemannian manifolds | Invent. Math., 150 (2002), 61–109 |
[6] F. Fang, X. Rong, Curvature, diameter, homotopy groups, and cohomology rings | Duke Math. J., 107 (2001), 135–158 |
[7] F. Fang, X. Rong, Positive pinching, volume and second Betti number | Geom. Funct. Anal., 9, (1999) 641–674 |
[8] F. Fang, Embedding four manifolds in R7 | Topology., 33 (1994), 447–454 |