Gao Ming Wang
Assistant Professor 
        Group: Analysis and Geometry
Office: A1-M02
Email: wanggaoming@bimsa.cn
Research Field: Geometric Analysis
Publication
- [1] H Hong, G Wang, A splitting theorem for manifolds with spectral nonnegative Ricci curvature and mean-convex boundary, arXiv, 2503.07009 (2025)
- [2] G Wang, Generalized Bernstein Theorem for stable minimal plateau surfaces, Annals of Global Analysis and Geometry, 67(4), 23 (2025)
- [3] H Hong, G Wang, A splitting theorem for 3-manifold with nonnegative scalar curvature and mean-convex boundary, arXiv, 2501.08677 (2025)
- [4] X Chai, G Wang, Scalar curvature rigidity of domains in a 3-dimensional warped product, arXiv, 2503.04025 (2025)
- [5] X Chai, G Wang, Dihedral rigidity in hyperbolic 3-space, Transactions of the American Mathematical Society, 377(02), 807-840 (2024)
- [6] G Wang, Allard-Type Regularity for Varifolds with Prescribed Contact Angle, arXiv, 2403.17415 (2024)
- [7] G Wang, Index of embedded networks in the sphere, Journal of Functional Analysis, 287(7), 110525 (2024)
- [8] H Hong, H Li, G Wang, On $\delta$ -Stable Minimal Hypersurfaces in $\mathbb{R}^{n+1}$, arXiv, 2407.03222 (2024)
- [9] X Chai, G Wang, Scalar curvature comparison of rotationally symmetric sets, arXiv, 2304.13152 (2023)
- [10] G Wang, Curvature estimates for stable minimal surfaces with a common free boundary, Calculus of Variations and Partial Differential Equations, 61(4), 138 (2022)
- [11] G Wang, General Theory of Partial Differential Equations on Triple Junction Surfaces, PQDT-Global (2022)
- [12] G Wang, Uniformization of surfaces with boundary and the application to the triple junction surfaces with negative Euler characteristic, arXiv, 2110.12656 (2021)
- [13] X CHAI, G WANG, SCALAR CURVATURE RIGIDITY OF ROTATIONALLY SYMMETRIC DOMAINS IN A WARPED PRODUCT
Update Time: 2025-10-31 17:00:12
 
                 
                                         
                                         
                                        