Articles with public access mandates - Alina ChertockLearn more
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Solving two-mode shallow water equations using finite volume methods
MJC Diaz, Y Cheng, A Chertock, A Kurganov
Communications in Computational Physics 16 (5), 1323-1354, 2014
Mandates: Government of Spain
Available somewhere: 35
A finite-volume method for nonlinear nonlocal equations with a gradient flow structure
JA Carrillo, A Chertock, Y Huang
Communications in Computational Physics 17 (1), 233-258, 2015
Mandates: UK Engineering and Physical Sciences Research Council, Government of Spain
On a chemotaxis model with saturated chemotactic flux
A Chertock, A Kurganov, X Wang, Y Wu
Kinet. Relat. Models 5 (1), 51-95, 2012
Mandates: German Research Foundation
Well-balanced schemes for the Euler equations with gravitation: Conservative formulation using global fluxes
A Chertock, S Cui, A Kurganov, ŞN Özcan, E Tadmor
Journal of Computational Physics 358, 36-52, 2018
Mandates: US National Science Foundation, US Department of Defense, National Natural …
Well-balanced schemes for the shallow water equations with Coriolis forces
A Chertock, M Dudzinski, A Kurganov, M Lukáčová-Medvid’ová
Numerische Mathematik 138, 939-973, 2018
Mandates: US National Science Foundation, US Department of Defense, German Research …
A new approach for designing moving-water equilibria preserving schemes for the shallow water equations
Y Cheng, A Chertock, M Herty, A Kurganov, T Wu
Journal of Scientific Computing 80, 538-554, 2019
Mandates: US National Science Foundation, National Natural Science Foundation of China …
High-order positivity-preserving hybrid finite-volume-finite-difference methods for chemotaxis systems
A Chertock, Y Epshteyn, H Hu, A Kurganov
Advances in Computational Mathematics 44, 327-350, 2018
Mandates: US National Science Foundation
A practical guide to deterministic particle methods
A Chertock
Handbook of numerical analysis 18, 177-202, 2017
Mandates: US National Science Foundation
An asymptotic preserving scheme for the two-dimensional shallow water equations with Coriolis forces
X Liu, A Chertock, A Kurganov
Journal of Computational Physics 391, 259-279, 2019
Mandates: US National Science Foundation, National Natural Science Foundation of China
Well-balanced central-upwind schemes for systems of balance laws
A Chertock, M Herty, ŞN Özcan
XVI International Conference on Hyperbolic Problems: Theory, Numerics …, 2016
Mandates: US National Science Foundation, German Research Foundation
An operator splitting based stochastic Galerkin method for the one-dimensional compressible Euler equations with uncertainty
A Chertock, S Jin, A Kurganov
preprint, 1-21, 2015
Mandates: National Natural Science Foundation of China
A second-order finite-difference method for compressible fluids in domains with moving boundaries
A Chertock, A Coco, A Kurganov, G Russo
Commun Comput Phys 23 (1), 2018
Mandates: US National Science Foundation, European Commission
Well-balancing via flux globalization: Applications to shallow water equations with wet/dry fronts
A Chertock, A Kurganov, X Liu, Y Liu, T Wu
Journal of Scientific Computing 90, 1-21, 2022
Mandates: US National Science Foundation, National Natural Science Foundation of China
Stochastic Galerkin method for cloud simulation
A Chertock, A Kurganov, M Lukáčová-Medvid’ová, P Spichtinger, B Wiebe
Mathematics of Climate and Weather Forecasting 5 (1), 65-106, 2019
Mandates: US National Science Foundation, National Natural Science Foundation of China …
An Eulerian–Lagrangian method for optimization problems governed by multidimensional nonlinear hyperbolic PDEs
A Chertock, M Herty, A Kurganov
Computational Optimization and Applications 59, 689-724, 2014
Mandates: German Research Foundation
An asymptotic-preserving method for a relaxation of the Navier–Stokes–Korteweg equations
A Chertock, P Degond, J Neusser
Journal of Computational Physics 335, 387-403, 2017
Mandates: US National Science Foundation, German Research Foundation, UK Engineering …
Local characteristic decomposition based central-upwind scheme
A Chertock, S Chu, M Herty, A Kurganov, M Lukáčová-Medvid'ová
Journal of Computational Physics 473, 111718, 2023
Mandates: US National Science Foundation, National Natural Science Foundation of China …
Central-upwind scheme for shallow water equations with discontinuous bottom topography
A Bernstein, A Chertock, A Kurganov
Bulletin of the Brazilian Mathematical Society, New Series 47, 91-103, 2016
Mandates: US National Science Foundation
Operator splitting based central-upwind schemes for shallow water equations with moving bottom topography
A Chertock, A Kurganov, T Wu
Communications in Mathematical Sciences 18 (8), 2020
Mandates: US National Science Foundation, National Natural Science Foundation of China
Well-balanced central-upwind schemes for the Euler equations with gravitation
A Chertock, S Cui, A Kurganov, ŞN Özcan, E Tadmor
SIAM J. Sci. Comput, 2016
Mandates: US National Science Foundation
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