The following publications are possibly variants of this publication:
- A robust and efficient numerical method to compute the dynamics of the rotating two-component dipolar Bose-Einstein condensatesQinglin Tang, Yong Zhang 0005, Norbert J. Mauser. cphysics, 219:223-235, 2017. [doi]
- An efficient and spectrally accurate numerical method for computing dynamics of rotating Bose-Einstein condensatesWeizhu Bao, Hanquan Wang. jcphy, 217(2):612-626, 2006. [doi]
- An efficient spectral method for computing dynamics of rotating two-component Bose-Einstein condensates via coordinate transformationJu Ming, Qinglin Tang, Yanzhi Zhang. jcphy, 258:538-554, 2014. [doi]
- Dynamics of Rotating Bose-Einstein Condensates and its Efficient and Accurate Numerical ComputationWeizhu Bao, Qiang Du, Yanzhi Zhang. siamam, 66(3):758-786, 2006. [doi]
- Efficiently computing vortex lattices in rapid rotating Bose-Einstein condensatesRong Zeng, Yanzhi Zhang. cphysics, 180(6):854-860, 2009. [doi]
- Perfectly matched layer for computing the dynamics of nonlinear Schrödinger equations by pseudospectral methods. Application to rotating Bose-Einstein condensatesXavier Antoine, Christophe Geuzaine, Qinglin Tang. cnsns, 90:105406, 2020. [doi]
- A Generalized-Laguerre--Fourier--Hermite Pseudospectral Method for Computing the Dynamics of Rotating Bose--Einstein CondensatesWeizhu Bao, Hailiang Li, Jie Shen. siamsc, 31(5):3685-3711, 2009. [doi]
- Efficient numerical methods for computing ground states and dynamics of dipolar Bose-Einstein condensatesWeizhu Bao, Yongyong Cai, Hanquan Wang. jcphy, 229(20):7874-7892, 2010. [doi]