A simple proof of Descartes's rule of signs X Wang The American Mathematical Monthly 111 (6), 525-526, 2004 | 175 | 2004 |
The BKK root count in Cn TY Li, X Wang Math. Comput. 65 (216), 1477-1484, 1996 | 116 | 1996 |
Counting Real Connected Components of Trinomial Curve Intersections and m-nomial Hypersurfaces TY Li, JM Rojas, X Wang Discrete & Computational Geometry 30, 379-414, 2003 | 88 | 2003 |
Counting affine roots of polynomial systems via pointed Newton polytopes JM Rojas, X Wang Journal of Complexity 12 (2), 116-133, 1996 | 88 | 1996 |
A modified weak Galerkin finite element method for the Stokes equations L Mu, X Wang, X Ye Journal of computational and applied mathematics 275, 79-90, 2015 | 74 | 2015 |
A weak Galerkin finite element scheme for solving the stationary Stokes equations R Wang, X Wang, Q Zhai, R Zhang Journal of Computational and Applied Mathematics 302, 171-185, 2016 | 60 | 2016 |
A modified weak Galerkin finite element method X Wang, NS Malluwawadu, F Gao, TC McMillan Journal of Computational and Applied Mathematics 271, 319-327, 2014 | 58 | 2014 |
A hybridized weak Galerkin finite element scheme for the Stokes equations QL Zhai, R Zhang, XS Wang Science China Mathematics 58, 2455-2472, 2015 | 54 | 2015 |
Finding All Isolated Zeros of Polynomial Systems inCnvia Stable Mixed Volumes T Gao, TY Li, X Wang Journal of Symbolic Computation 28 (1-2), 187-211, 1999 | 50 | 1999 |
A modified weak Galerkin finite element method for a class of parabolic problems F Gao, X Wang Journal of Computational and Applied Mathematics 271, 1-19, 2014 | 47 | 2014 |
A note on the optimal degree of the weak gradient of the stabilizer free weak Galerkin finite element method A Al-Taweel, X Wang Applied Numerical Mathematics 150, 444-451, 2020 | 38 | 2020 |
Solving real polynomial systems with real homotopies TY Li, XS Wang mathematics of computation 60 (202), 669-680, 1993 | 38 | 1993 |
A weak Galerkin finite element method for the Navier-Stokes equations J Zhang, K Zhang, J Li, X Wang Commun. Comput. Phys 23 (3), 706-746, 2018 | 33 | 2018 |
Nonlinear homotopies for solving deficient polynomial systems with parameters TY Li, X Wang SIAM journal on numerical analysis 29 (4), 1104-1118, 1992 | 33 | 1992 |
A modified weak Galerkin finite element method for Sobolev equation F Gao, X Wang Journal of Computational Mathematics, 307-322, 2015 | 32 | 2015 |
On multivariate Descartes’ rule—a counterexample TY Li, X Wang Beiträge Algebra Geom 39 (1), 1-5, 1998 | 29 | 1998 |
Finite element methods for the Navier-Stokes equations by H (div) elements J Wang, X Wang, X Ye Journal of Computational Mathematics, 410-436, 2008 | 28 | 2008 |
22. Shape Regularity Conditions for Polygonal /polyhedral Meshes, Exemplified in a Discontinuous Galekin Discretization YW Lin Mu, X wang Numerical Methods for Partial Differential Equations. 31 (1), 308-325, 2015 | 26 | 2015 |
A stabilizer free weak Galerkin finite element method with supercloseness of order two AA Taweel, X Wang, X Ye, S Zhang Numerical Methods for Partial Differential Equations, 2020 | 25 | 2020 |
Primal-dual active set method for pricing American better-of option on two assets Y Gao, H Song, X Wang, K Zhang Communications in Nonlinear Science and Numerical Simulation 80, 104976, 2020 | 25 | 2020 |