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Yong Wei

Special Professor

Supervisor of Doctorate Candidates


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Business Address:Guanli Keyan Lou 1305

Contact Information:0551-63600940

Alma Mater:Tsinghua Univeristy

Discipline:Mathematics

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Current position: Yong Wei's homepage >> Research >> Publications
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Full list of publications can be found in MathSciNet

17. A complete family of Alexandrov-Fenchel inequalities for convex capillary hypersurfaces in the half-space (with Yingxiang Hu, Bo Yang and Tailong Zhou),  Math. Ann., 2024.

16. Volume preserving Gauss curvature flow of convex hypersurfaces in H^{n+1} (with Bo Yang and Tailong Zhou),   Trans. AMS, 377 (2024), no. 4, Pages 2821–2854.

15. On the mean curvature type flow for convex capillary hypersurfaces in the ball (with Yingxiang Hu, Bo Yang, Tailong Zhou),  Calc.Var.Partial Differ. Equ., Vol. 62, no. 7, article no. 209, 2023.

14. Geometric inequalities involving three quantities in warped product manifolds (with Kwok-Kun Kwong), Advances in Math. ,Volume 430, 1 October 2023, article no. 109213.

13. Shifted inverse curvature flows in hyperbolic space (with Xianfeng Wang and Tailong Zhou), Calc.Var.Partial Differ. Equ., 62 (2023), no.3, article no.93.

12. Volume preserving flows for convex curves and surfaces in the hyperbolic space (with Bo Yang), J. Func. Anal., 283, no. 11, Article 109685, 2022.

11. On an inverse curvature flow in two-dimensional space forms (with Kwok-Kun Kwong, Glen Wheeler, and Valentina-Mira Wheeler), Math. Ann. (2022) 384: 285-308.

10. Locally constrained curvature flows and geometric inequalities in hyperbolic space (with Yingxiang Hu and Haizhong Li), Math. Ann., (2022) 382:1425-1474. 

9. A volume-preserving anisotropic mean curvature type flow (with Changwei Xiong), Indiana Univ. Math. J.70 (2021), 881-906. 

8. Volume preserving flow and Alexandrov-Fenchel type inequalities in hyperbolic space (with Ben Andrews and Xuzhong Chen), J. Eur. Math. Soc., 23 (2021), no. 7, 2467-2509. 

7. Volume preserving flow by powers of kth mean curvature (with Ben Andrews), J. Differential Geom, 117 (2021), no. 2 , 193-222

6. Stability of torsion-free G2 structure along the Laplacian flow (with Jason D. Lotay), J. Differential Geom., 111 (2019), no. 3, 495-526.

5. Quermassintegral preserving curvature flow in hyperbolic space (with Ben Andrews), Geom. Funct. Anal., 2018, 28(5), 1183-1208.

4. On the Minkowski-type inequality for outward minimizing hypersurfaces in Schwarzschild space, Calc.Var.Partial Differ. Equ., 2018, vol. 57, no. 2, article no. 46.

3. On inverse mean curvature flow in Schwarzchild space and Kottler space (with Haizhong Li), Calc.Var.Partial Differ. Equ.,2017, vol. 56, no. 3, article no. 62

2. Laplacian flow for closed G2 structures: Shi-type estimate, uniqueness and compactness (with Jason D. Lotay), Geom. Funct. Anal., 2017, 27(1), 165-233.

1. A geometric inequality on hypersurface in hyperbolic space (with Haizhong Li and Changwei Xiong), Advances in Math., 2014, 253(1):152-162