宣海玲

宣海玲,女,副教授。博士毕业于浙江大学数学科学学院,主要研究方向是半变分不等式、接触问题、数学建模等，已经发表相关SCI论文10余篇。

教学课程：高等数学、线性代数

科研项目：浙江省自然科学基金探索项目，在研，主持

学生指导：指导本科生发表二区SCI论文，指导本科生获得优秀毕业论文

部分科研论文：

1．Hailing Xuan, Xiaoliang Cheng and Lele Yuan*, Numerical studies of a class of thermoviscoelastic frictional contact problem described by fractional differential hemivariational inequalities, Journal of Scientific Computing, 2025, 103: 4.

2．Qichang Xiao, Xiaoliang Cheng, Kewei Liang,Hailing Xuan*, Numerical analysis of a variational-hemivariational inequality governed by the Stokes equations, Computers and Mathematics with Applications, 2024, 159: 1-10.

3. Xilu Wang, Xiaoliang Cheng andHailing Xuan*, Analysis of a parabolic bilateral obstacle problem with non-monotone relations in the domain, Mathematics and Mechanics of Solids, 2024: 1-16.

4．Hailing xuan*andXiaoliang Cheng, Analysis and simulation of an adhesive contact problem governed by fractional differential hemivariational inequalities with history-dependent operator, Evolution Equations and Control Theory, 2023,12:1316-1339.

5．HailingXuan*andXiaoliangCheng, Analysis of a system of hemivariational inequalities arising in non-stationary Stokes equation with thermal effects，East Asian Journal on Applied Mathematics, 2023.

6.Hailing Xuan*,XiaoliangCheng and QichangXiao, Analysis of a doubly-history dependent variational-hemivariational inequality arsing in adhesive contact problem，Applicable Analysis, 2023.

7.HailingXuan*and XiaoliangCheng, Numerical analysis and simulations of a frictional contact problem with damage and memory, Mathematical Control and Related Fields, 2021,12:621-639.

8.HailingXuan*and XiaoliangCheng, Numerical analysis of an adhesive contact problem with damage and long memory, Discrete and Continuous Dynamic Systems, Series-B, 2021,26:2781-2804.

9.HailingXuan*and XiaoliangCheng, Numerical analysis of a thermal frictional contact problem with long memory, Communications on Pure and Applied Analysis, 2021,20:1521-1543.

10.XiaoliangCheng,HailingXuan*and QichangXiao, Analysis of Rothe method for a variational-hemivariational inequality in adhesive contact problem for locking materials, International Journal of Numerical Analysis and Modeling, 2021,18:287-310.

11.HailingXuan*, XiaoliangCheng, WeiminHan and QichamgXiao, Numerical analysis of a dynamic contact problem with history-dependent operators, Numerical Mathematics-Theory Methods and Applications, 2020,13:569-594.

12.H.L.Xuan*and X.L.Cheng, Numerical analysis and simulation of a frictional contact problem with wear, damage and long memory, East Asian Journal on AppliedMathematics, 2020,10:659-678.