Projects per year
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Projects
CANONICAL METRICS, THE KAHLER-RICCI FLOW, AND THEIR APPLICA1ONS
National Science Foundation (National Science Foundation (NSF))
9/1/17 → 8/31/20
Project: Research project
CANONICAL METRICS, GEOMETRIC FLOWS AND FORMATION OF SINGULARITIES
National Science Foundation (National Science Foundation (NSF))
8/1/14 → 7/31/17
Project: Research project
CAREER: CANONICAL METRICS, COMPLEX MONGE-AMPERE EQUATIONS AND GEOMETRIC FLOWS
National Science Foundation (National Science Foundation (NSF))
8/15/09 → 7/31/14
Project: Research project
NONLINEAR GEO METRIC EQUATIONS OF MONGE-AMPERE TYPE AND CANONICAL METRICS
National Science Foundation (National Science Foundation (NSF))
9/10/07 → 6/30/10
Project: Research project
Research Output
The Ricci flow on the sphere with marked points
Phong, D. H., Song, J., Sturm, J. & Wang, X., Jan 1 2020, In : Journal of Differential Geometry. 114, 1, p. 117-170 54 p.Research output: Contribution to journal › Article
A remark on constant scalar curvature kahler metrics on minimal models
Jian, W., Shi, Y. & Song, J., Jan 1 2019, In : Proceedings of the American Mathematical Society. 147, 8, p. 3507-3513 7 p.Research output: Contribution to journal › Article
1
Scopus
citations
Geometric estimates for complex Monge-Ampère equations
Fu, X., Guo, B. & Song, J., Jan 1 2019, (Accepted/In press) In : Journal fur die Reine und Angewandte Mathematik.Research output: Contribution to journal › Article
Connecting toric manifolds by conical Kähler–Einstein metrics
Datar, V., Guo, B., Song, J. & Wang, X., Jan 7 2018, In : Advances in Mathematics. 323, p. 38-83 46 p.Research output: Contribution to journal › Article
4
Scopus
citations
The Kähler–Ricci flow through singularities
Song, J. & Tian, G., Feb 1 2017, In : Inventiones Mathematicae. 207, 2, p. 519-595 77 p.Research output: Contribution to journal › Article
32
Scopus
citations