Keywords generalized Korn inequality on nonconforming finite element space, mathematical application, 16,
2. Zhang Qingmian, Xu Ming, Wang Ming, Wu Beiya, Wang Fenglan 199 1 Intelligent Teaching Organization Management and Course Scheduling System, Journal of Dalian University of Technology, 3 1, 2,227-232. 3. Wang Ming 1990 What is a quasi-matching element? Computational mathematics,12,2,206-207. 4. Wang Ming 1990, on the inequality of the maximum modulus in nonconforming finite element space, computational mathematics, 12, 1, 104- 107.5, etc. Computational structural mechanics and its application, 5,4,115-17.6, Wang Ming, Zhang Hongqing, 1988, Embedding properties and compactness of finite element space, applied mathematics and mechanics, 9,2,/ 7. Wang Ming 1987 Penalty Function Finite Element Method for Steady Stokes Problem, Computational Mathematics, 9, 3, 309-3 18. 8, Wang Ming 1987A, a new method of upwind finite element, mathematical research and comments, 7, 1, 124. 9, Zhang Hongqing, Wang Ming 1986 Compactness of Quasi-conforming Element Space and Convergence of Quasi-conforming Element Method, Applied Mathematics and Mechanics, 7, 5, 409-423. 10, Wang Ming, Zhang Hongqing 1986 Notes on Several Finite Element Methods, Computational Mathematics, 8,3,303-313. 1 1, Wang Ming, Zhang Hongqing 1986 Finite Element Method for Plane Steady Navier-Stokes Equation, Journal of Dalian Institute of Technology, 25, Supplement, 1-6. 12, Wang Ming. Zhang Hongqing 1986 Penalty Finite Element Method for Steady Navier-Stokes Equation, Journal of Dalian University of Technology, 25, Supplement, 7- 13. 13, Wang Ming 1986 finite element method for a class of coupling problems between complex nonlinear Schrodinger equation and real nonlinear Klein-Gordon equation 25, 1,1-105./