完全非线性偏微分方程

教育背景：
2003/09-2008/06，南京理工大学，理学院，博士（硕博连读）
1999/09-2003/06，南京理工大学，理学院，学士
工作经历：
2008/07-至今，湖北大学，教师
2017/09-2018/08，美国俄亥俄州立大学，访问学者（CSC资助）

1、Li Chen, Qiang Tu, Di Wu,Ni Xiang,regularity for solutions to the degeneratedual Minkowski problem, Calc. Var. Partial Differential Equations, 2021,115(3).
2、Li Chen, Qiang Tu,Ni Xiang, Pogorelov type estimates for a class of Hessian quotient equations,J. Differential Equations, 2021, 282(5): 272-284.
3、Xiaojuan Chen, Qiang Tu,Ni Xiang, A class of Hessian quotient equations in Euclidean space, J. Differential Equations, 2020, 269(12): 11172-11194.
4、Li Chen,Ni Xiang, Rigidity theorems for the entire solutions of 2-Hessian equation,J. Differential Equations, 2019, 267(9): 5202-5219.
5、Feida Jiang,Ni Xiang, JinJu Xu, Gradient estimates for Neumann boundary value problem of Monge-Ampère type equations, Communications in Contemporary Mathematics, 2017, 19(4):1-16.
6、Feida Jiang, N.S.Trudinger,Ni Xiang, On the Neumann problem for Monge-Ampère type equations, Canadian Journal of Mathematics, 2016, 68(6): 1334-1361.
7、Ni Xiang, Xiaoping Yang, The complex Hessian equation with infinite boundary value, Proceeding of American Mathematical Society, 2008, 136(6): 2103-2111.
8、Li Chen, Qiang Tu, Di Wu andNi Xiang, Anisotropic Gauss curvature flows and their associated Dual Orlicz-Minkowski problems, accepted by Proc. A Royal Soc. Edinburgh, 2021.

1、复Monge-Ampère方程的边值问题，国家自然科学基金数学天元基金项目，2010.1至2010.12.
2、复Hessian方程的边值问题，国家自然科学基金青年项目，2012.1至2014.12.
3、流形上几类完全非线性偏微分方程Neumann问题解的正则性研究,国家自然科学基金面上项目，2020.1至2023.12.