Symplectic geometric algorithms for Hamiltonian systems K Feng, M Qin Springer, 2010 | 573 | 2010 |
The symplectic methods for the computation of Hamiltonian equations K Feng, M Qin Numerical Methods for Partial Differential Equations: Proceedings of a …, 1987 | 270 | 1987 |
Multi-symplectic Fourier pseudospectral method for the nonlinear Schrödinger equation JB Chen, MZ Qin Electron. Trans. Numer. Anal 12, 193-204, 2001 | 210 | 2001 |
Construction of canonical difference schemes for Hamiltonian formalism via generating functions F Kang, W Hua-mo, Q Meng-Zhao, W Dao-Liu Journal of Computational Mathematics, 71-96, 1989 | 184 | 1989 |
Multisymplectic geometry and multisymplectic Preissmann scheme for the KdV equation PF Zhao, MZ Qin Journal of Physics A: Mathematical and General 33 (18), 3613, 2000 | 173 | 2000 |
Hamiltonian algorithms for Hamiltonian systems and a comparative numerical study F Kang, Q Meng-Zhao Computer Physics Communications 65 (1-3), 173-187, 1991 | 128 | 1991 |
Multi-symplectic methods for the coupled 1D nonlinear Schrödinger system JQ Sun, MZ Qin Computer Physics Communications 155 (3), 221-235, 2003 | 121 | 2003 |
Symplectic and multi-symplectic methods for the nonlinear Schrödinger equation JB Chen, MZ Qin, YF Tang Computers & Mathematics with Applications 43 (8-9), 1095-1106, 2002 | 119 | 2002 |
Multi-stage symplectic schemes of two kinds of Hamiltonian systems for wave equations Q Meng-Zhao, Z Mei-Qing Computers & Mathematics with Applications 19 (10), 51-62, 1990 | 96 | 1990 |
Construction of higher order symplectic schemes by composition Q Meng-Zhao, Z Wen-Jie Computing 47 (3-4), 309-321, 1991 | 85 | 1991 |
Symplectic difference schemes for linear Hamiltonian canonical systems F Kang, W Hua-mo, Q Meng-Zhao Journal of Computational Mathematics, 371-380, 1990 | 73 | 1990 |
Explicit symplectic difference schemes for separable Hamiltonian systems Q Meng-Zhao, W Dao-Liu, Z Mei-Qing Journal of Computational Mathematics, 211-221, 1991 | 66 | 1991 |
Local structure-preserving algorithms for partial differential equations YS Wang, B Wang, MZ Qin Science in China Series A: Mathematics 51 (11), 2115-2136, 2008 | 54 | 2008 |
Multisymplectic geometry and multisymplectic Preissman scheme for the KP equation T Liu, M Qin Journal of Mathematical Physics 43 (8), 4060-4077, 2002 | 47 | 2002 |
A symplectic difference scheme for the infinite dimensional Hamilton system L Chun-wang, Q Meng-zhao Journal of Computational Mathematics, 164-174, 1988 | 47 | 1988 |
Construction of symplectic schemes for wave equations via hyperbolic functions sinh (x), cosh (x) and tanh (x) M Qin, W Zhu Computers & Mathematics with Applications 26 (8), 1-11, 1993 | 45 | 1993 |
A sixth order averaged vector field method H Li, Y Wang, M Qin Journal of Computational Mathematics, 479-498, 2016 | 43 | 2016 |
Hamiltonian algorithms for Hamiltonian dynamical systems 冯康, 秦孟兆 自然科学进展: 英文版, 105-116, 1991 | 40 | 1991 |
Symplectic schemes for Birkhoffian system S Hong-Ling, Q Meng-Zhao Communications in Theoretical Physics 41 (3), 329, 2004 | 34 | 2004 |
A multi-symplectic scheme for RLW equation Y Sun, M Qin Journal of Computational Mathematics, 611-621, 2004 | 33 | 2004 |