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 | 200 | 2011 |
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 | 57 | 2014 |
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 | 54 | 2015 |
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 | 51 | 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 | 41 | 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 | 40 | 2009 |
Unsuitability of the Beavers–Joseph interface condition for filtration problems E Eggenweiler, I Rybak Journal of Fluid Mechanics 892, A10, 2020 | 37 | 2020 |
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, 621-635, 2021 | 34 | 2021 |
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, 1-23, 2021 | 30 | 2021 |
Modeling two-fluid-phase flow and species transport in porous media IV Rybak, WG Gray, CT Miller Journal of Hydrology 521, 565-581, 2015 | 30 | 2015 |
Effective Coupling Conditions for Arbitrary Flows in Stokes--Darcy Systems E Eggenweiler, I Rybak Multiscale Modeling & Simulation 19 (2), 731-757, 2021 | 24 | 2021 |
Monotone and conservative difference schemes for elliptic equations with mixed derivatives IV Rybak Mathematical Modelling and Analysis 9 (2), 169-178, 2004 | 21 | 2004 |
Difference schemes for elliptic equations with mixed derivatives P Matus, I Rybak Computational methods in applied mathematics 4 (4), 494-505, 2004 | 18 | 2004 |
A dimensionally reduced Stokes–Darcy model for fluid flow in fractured porous media I Rybak, S Metzger Applied Mathematics and Computation 384, 125260, 2020 | 12 | 2020 |
On numerical upscaling for flows in heterogeneous porous media O Iliev, I Rybak Computational Methods in Applied Mathematics 8 (1), 60-76, 2008 | 12 | 2008 |
Modelling sediment transport in three-phase surface water systems CT Miller, WG Gray, CE Kees, IV Rybak, BJ Shepherd Journal of Hydraulic Research, 2019 | 11 | 2019 |
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 | 9 | 2016 |
Mathematical modeling of coupled free flow and porous medium systems I Rybak | 9 | 2016 |
A modification of the Beavers–Joseph condition for arbitrary flows to the fluid–porous interface P Strohbeck, E Eggenweiler, I Rybak Transport in Porous Media 147 (3), 605-628, 2023 | 7 | 2023 |
An efficient approach for upscaling properties of composite materials with high contrast of coefficients R Ewing, O Iliev, R Lazarov, I Rybak, J Willems | 7 | 2007 |