Mass-conservative Fourier spectral methods for solving the fractional nonlinear Schrödinger equation S Duo, Y Zhang Computers & Mathematics with Applications 71 (11), 2257-2271, 2016 | 123 | 2016 |
A novel and accurate finite difference method for the fractional Laplacian and the fractional Poisson problem S Duo, HW van Wyk, Y Zhang Journal of Computational Physics 355, 233-252, 2018 | 102 | 2018 |
A comparative study on nonlocal diffusion operators related to the fractional Laplacian S Duo, H Wang, Y Zhang arXiv preprint arXiv:1711.06916, 2017 | 61 | 2017 |
Accurate numerical methods for two and three dimensional integral fractional Laplacian with applications S Duo, Y Zhang Computer Methods in Applied Mechanics and Engineering 355, 639-662, 2019 | 60 | 2019 |
Computing the ground and first excited states of the fractional Schrödinger equation in an infinite potential well S Duo, Y Zhang Communications in Computational Physics 18 (2), 321-350, 2015 | 53 | 2015 |
A fast algorithm for solving the space–time fractional diffusion equation S Duo, L Ju, Y Zhang Computers & Mathematics with Applications 75 (6), 1929-1941, 2018 | 20 | 2018 |
Numerical approximations for the tempered fractional Laplacian: Error analysis and applications S Duo, Y Zhang Journal of Scientific Computing 81, 569-593, 2019 | 18 | 2019 |
A fractional phase-field model using an infinitesimal generator of α stable Lévy process S Duo, H Wang Journal of Computational Physics 384, 253-269, 2019 | 8 | 2019 |
Dynamics of plane waves in the fractional nonlinear Schrödinger equation with long-range dispersion S Duo, TI Lakoba, Y Zhang Symmetry 13 (8), 1394, 2021 | 5 | 2021 |
Finite difference methods for two and three dimensional fractional Laplacian with applications to solve the fractional reaction-diffusion equations S Duo, Y Zhang arXiv preprint arXiv:1804.02718, 2018 | 4 | 2018 |
ClusTop: An unsupervised and integrated text clustering and topic extraction framework Z Chen, C Mi, S Duo, J He, Y Zhou arXiv preprint arXiv:2301.00818, 2023 | 3 | 2023 |
Simple and accurate finite difference methods for the d-dimensional tempered fractional Laplacian and their applications S Duo, Y Zhang arXiv preprint arXiv:1808.02615, 2018 | | 2018 |
Numerical investigation on nonlocal problems with the fractional Laplacian S Duo Missouri University of Science and Technology, 2017 | | 2017 |