[1] Jinming Zhang, Zhanjing Tao, Jun Zhu, Jianxian Qiu, A hybrid MR-WENO scheme with a simplified troubled-cell indicator for hyperbolic conservation laws,Computers and Mathematics with Applications, 2026, 207: 1-14.
[2] Zhanjing Tao, Zhengfu Xu, Jianxian Qiu, Maximum-principle-preserving and positivity-preserving central WENO schemes on overlapping meshes, Communications in Computational Physics, 2026, 39(4): 1164-1198.
[3] Lidan Zhao, Zhanjing Tao, Min Zhang, Well-Balanced fifth-order finite volume WENO schemes with constant subtraction technique for shallow water equations, Journal of Scientific Computing, 2025, 102: 32;
[4] Xiaoyang Xie, Zhanjing Tao, Chunhai Jiao, Min Zhang, An efficient fifth-order interpolation-based Hermite WENO scheme for hyperbolic conservation laws,Journal of Computational Physics, 2025, 523: 113673.
[5] Z. Tao, J. Zhang, J. Zhu, J. Qiu, High-order multi-resolution central Hermite WENO schemes for hyperbolic conservation laws, Journal of Scientific Computing, 2024, 99: 40.
[6] S. Cui, Z. Tao, J. Zhu, A new fifth-order finite volume central WENO scheme for hyperbolic conservation laws on staggered meshes, Advances in Applied Mathematics and Mechanics, 2022, 14(5): 1059-1086.
[7] S. Cui, Z. Tao, J. Zhu, New finite difference unequal-sized Hermite WENO scheme for Navier-Stokes equations, Computers and Mathematics with Applications, 2022, 128: 273–284.
[8] J. Huang, Y. Liu, Y. Liu, Z. Tao, Y. Cheng, A class of adaptive multiresolution ultra-weak discontinuous Galerkin methods for some nonlinear dispersive wave equations, SIAM Journal on Scientific Computing, 2022, 44(2): A745-A769.
[9] Z. Tao, J. Huang, Y. Liu, W. Guo, Y. Cheng, An adaptive multiresolution ultra-weak discontinuous Galerkin method for nonlinear Schrodinger equations, Communications on Applied Mathematics and Computation 2022, 4: 60–83.
[10] W. Guo, J. Huang, Z. Tao, Y. Cheng, An adaptive sparse grid local discontinuous Galerkin method for Hamilton-Jacobi equations in high dimensions, Journal of Computational Physics, 2021, 436: 110294.
[11] Z. Tao, Y. Jiang, Y. Cheng, An adaptive high-order piecewise polynomial based sparse grid collocation method with applications, Journal of Computational Physics, 2021, 433: 109770.
[12] J. Huang, Y. Liu, W.Guo, Z. Tao, Y. Cheng, An adaptive multiresolution interior penalty discontinuous Galerkin method for wave equations in second order form, Journal of Scientific Computing, 2020, 85: 13.
[13] Z. Tao, A. Chen, M. Zhang, Y. Cheng, Sparse grid central discontinuous Galerkin method for linear hyperbolic systems in high dimensions, SIAM Journal on Scientific Computing, 2019, 41(3): A1626-A1651.
[14] Z. Tao, W. Guo, Y. Cheng, Sparse grid discontinuous Galerkin methods for the Vlasov-Maxwell system, Journal of Computational Physics: X, 2019, 3: 100022.
[15] Z. Tao, J. Qiu, Dimension-by-dimension moment-based central Hermite WENO schemes for directly solving Hamilton-Jacobi equations, Advances in Computational Mathematics, 2017, 43: 1023-1058.
[16] Z. Tao, F. Li, J. Qiu, High-order central Hermite WENO schemes: Dimension-by-dimension moment-based reconstructions, Journal of Computational Physics, 2016, 318: 222-251.
[17] Z. Tao, F. Li, J. Qiu, High-order central Hermite WENO schemes on staggered meshes for hyperbolic conservation laws, Journal of Computational Physics, 2015, 281: 148-176.
