Alexander Kurganov
Affiliations: | Mathematics | Tulane University School of Science and Engineering |
Area:
Applied Mathematics, Mathematics, Physical OceanographyGoogle:
"Alexander Kurganov"Children
Sign in to add trainee| Anthony Polizzi | grad student | 2012 | Tulane University School of Science and Engineering |
| Jeremy D. Dewar | grad student | 2013 | Tulane University School of Science and Engineering |
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Publications
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| Liu X, Chen X, Jin S, et al. (2020) Moving-Water Equilibria Preserving Partial Relaxation Scheme for the Saint-Venant System Siam Journal On Scientific Computing. 42 |
| Kurganov A, Liu Y, Zeitlin V. (2020) Thermal versus isothermal rotating shallow water equations: comparison of dynamical processes by simulations with a novel well-balanced central-upwind scheme Geophysical and Astrophysical Fluid Dynamics. 1-30 |
| Kurganov A, Liu Y, Zeitlin V. (2020) Moist-convective thermal rotating shallow water model Physics of Fluids. 32: 66601 |
| Kurganov A, Liu Y, Zeitlin V. (2020) A well-balanced central-upwind scheme for the thermal rotating shallow water equations Journal of Computational Physics. 411: 109414 |
| Ghazizadeh MA, Mohammadian A, Kurganov A. (2020) An adaptive well-balanced positivity preserving central-upwind scheme on quadtree grids for shallow water equations Computers & Fluids. 208: 104633 |
| Chertock A, Kurganov A, check{d}}}$ová MLr, et al. (2019) An asymptotic preserving scheme for kinetic chemotaxis models in two space dimensions Kinetic and Related Models. 12: 195-216 |
| Díaz MJC, Kurganov A, Luna TMd. (2019) Path-conservative central-upwind schemes for nonconservative hyperbolic systems Mathematical Modelling and Numerical Analysis. 53: 959-985 |
| Liu X, Chertock A, Kurganov A. (2019) An asymptotic preserving scheme for the two-dimensional shallow water equations with Coriolis forces Journal of Computational Physics. 391: 259-279 |
| Chertock A, Kurganov A, Ricchiuto M, et al. (2019) Adaptive moving mesh upwind scheme for the two-species chemotaxis model Computers & Mathematics With Applications. 77: 3172-3185 |
| Liu X, Chertock A, Kurganov A, et al. (2019) One-Dimensional/Two-Dimensional Coupling Approach with Quadrilateral Confluence Region for Modeling River Systems Journal of Scientific Computing. 81: 1297-1328 |