Iryna Rybak
Iryna Rybak
Institute of Applied Analysis and Numerical Simulation, University of Stuttgart
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Cited by
A coupling concept for two‐phase compositional porous‐medium and single‐phase compositional free flow
K Mosthaf, K Baber, B Flemisch, R Helmig, A Leijnse, I Rybak, ...
Water Resources Research 47 (10), 2011
Multirate time integration for coupled saturated/unsaturated porous medium and free flow systems
I Rybak, J Magiera, R Helmig, C Rohde
Computational Geosciences 19 (2), 299-309, 2015
A multiple-time-step technique for coupled free flow and porous medium systems
I Rybak, J Magiera
Journal of Computational Physics 272, 327-342, 2014
Thermodynamically constrained averaging theory approach for modeling flow and transport phenomena in porous medium systems: 9. Transition region models
AS Jackson, I Rybak, R Helmig, WG Gray, CT Miller
Advances in water resources 42, 71-90, 2012
Applications of fully conservative schemes in nonlinear thermoelasticity: modelling shape memory materials
P Matus, RVN Melnik, L Wang, I Rybak
Mathematics and Computers in Simulation 65 (4-5), 489-509, 2004
A simplified method for upscaling composite materials with high contrast of the conductivity
R Ewing, O Iliev, R Lazarov, I Rybak, J Willems
SIAM journal on scientific computing 31 (4), 2568-2586, 2009
Modeling two-fluid-phase flow and species transport in porous media
IV Rybak, WG Gray, CT Miller
Journal of Hydrology 521, 565-581, 2015
Validation and calibration of coupled porous-medium and free-flow problems using pore-scale resolved models
I Rybak, C Schwarzmeier, E Eggenweiler, U Rüde
Computational Geosciences 25 (2), 621-635, 2021
Unsuitability of the Beavers–Joseph interface condition for filtration problems
E Eggenweiler, I Rybak
Journal of Fluid Mechanics 892, 2020
Monotone and conservative difference schemes for elliptic equations with mixed derivatives
IV Rybak
Mathematical Modelling and Analysis 9 (2), 169-178, 2004
Difference schemes for elliptic equations with mixed derivatives
P Matus, I Rybak
Computational methods in applied mathematics 4 (4), 494-505, 2004
On numerical upscaling for flows in heterogeneous porous media
O Iliev, I Rybak
Computational Methods in Applied Mathematics 8 (1), 60-76, 2008
A hyperbolic–elliptic model problem for coupled surface–subsurface flow
J Magiera, C Rohde, I Rybak
Transport in Porous Media 114 (2), 425-455, 2016
Modelling sediment transport in three-phase surface water systems
CT Miller, WG Gray, CE Kees, IV Rybak, BJ Shepherd
Journal of Hydraulic Research, 2019
An efficient approach for upscaling properties of composite materials with high contrast of coefficients
R Ewing, O Iliev, R Lazarov, I Rybak, J Willems
Effective Coupling Conditions for Arbitrary Flows in Stokes--Darcy Systems
E Eggenweiler, I Rybak
Multiscale Modeling & Simulation 19 (2), 731-757, 2021
On upscaling heat conductivity for a class of industrial problems
O Iliev, I Rybak, J Willems
On upscaling heat conductivity for a class of industrial problems
O Iliev, I Rybak, J Willems
Computational aspects of conservative difference schemes for shape memory alloys applications
RVN Melnik, L Wang, P Matus, I Rybak
International Conference on Computational Science and Its Applications, 791-800, 2003
Permeability estimation of regular porous structures: a benchmark for comparison of methods
A Wagner, E Eggenweiler, F Weinhardt, Z Trivedi, D Krach, C Lohrmann, ...
Transport in porous media 138 (1), 1-23, 2021
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