Qinglin Tang
Affiliations: | National University of Singapore, Singapore, Singapore |
Area:
computational mathematicsGoogle:
"Qinglin Tang"
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Publications
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| Antoine X, Geuzaine C, Tang Q. (2020) Perfectly Matched Layer for computing the dynamics of nonlinear Schrödinger equations by pseudospectral methods. Application to rotating Bose-Einstein condensates Communications in Nonlinear Science and Numerical Simulation. 90: 105406 |
| Bao W, Carles R, Su C, et al. (2019) Error estimates of a regularized finite difference method for the logarithmic Schrödinger equation Siam Journal On Numerical Analysis. 57: 657-680 |
| Bao W, Ha S, Kim D, et al. (2019) Collective synchronization of the multi-component Gross–Pitaevskii–Lohe system Physica D: Nonlinear Phenomena. 400: 132158 |
| Bao W, Carles R, Su C, et al. (2019) Regularized numerical methods for the logarithmic Schrodinger equation Numerische Mathematik. 143: 461-487 |
| Antoine X, Tang Q, Zhang Y. (2018) A Preconditioned Conjugated Gradient Method for Computing Ground States of Rotating Dipolar Bose-Einstein Condensates via Kernel Truncation Method for Dipole-Dipole Interaction Evaluation Communications in Computational Physics. 24: 966-988 |
| Antoine X, Tang Q, Zhang J. (2018) On the numerical solution and dynamical laws of nonlinear fractional Schrödinger/Gross–Pitaevskii equations International Journal of Computer Mathematics. 95: 1423-1443 |
| Antoine X, Lorin E, Tang Q. (2017) A friendly review of absorbing boundary conditions and perfectly matched layers for classical and relativistic quantum waves equations Molecular Physics. 115: 1861-1879 |
| Antoine X, Levitt A, Tang Q. (2017) Efficient spectral computation of the stationary states of rotating Bose–Einstein condensates by preconditioned nonlinear conjugate gradient methods Journal of Computational Physics. 343: 92-109 |
| Tang Q, Zhang Y, Mauser NJ. (2017) A robust and efficient numerical method to compute the dynamics of the rotating two-component dipolar Bose-Einstein condensates Computer Physics Communications. 219: 223-235 |
| Bao W, Cai Y, Jia X, et al. (2017) Numerical Methods and Comparison for the Dirac Equation in the Nonrelativistic Limit Regime Journal of Scientific Computing. 71: 1094-1134 |