Existence results for Hele–Shaw flow driven by surface tension G Prokert European Journal of Applied Mathematics 9 (2), 195-221, 1998 | 50 | 1998 |
Existence results for the quasistationary motion of a free capillary liquid drop M Günther, G Prokert Zeitschrift für Analysis und ihre Anwendungen 16 (2), 311-348, 1997 | 38 | 1997 |
Analyticity of solutions to nonlinear parabolic equations on manifolds and an application to Stokes flow J Escher, G Prokert Journal of Mathematical Fluid Mechanics 8, 1-35, 2006 | 30 | 2006 |
A justification for the thin film approximation of Stokes flow with surface tension M Günther, G Prokert Journal of Differential Equations 245 (10), 2802-2845, 2008 | 24 | 2008 |
Parabolic evolution equations for quasistationary free boundary problems in capillary fluid mechanics G Prokert | 20 | 1997 |
Two-phase Stokes flow by capillarity in full 2d space: an approach via hydrodynamic potentials BV Matioc, G Prokert Proceedings of the Royal Society of Edinburgh Section A: Mathematics 151 (6 …, 2021 | 17 | 2021 |
On a Hele--Shaw-Type Domain Evolution with Convected Surface Energy Density M Günther, G Prokert SIAM journal on mathematical analysis 37 (2), 372-410, 2005 | 17 | 2005 |
Hele–Shaw flow in thin threads: A rigorous limit result BV Matioc, G Prokert Interfaces and free boundaries 14 (2), 205-230, 2012 | 13 | 2012 |
On a Hele–Shaw type domain evolution with convected surface energy density: The third-order problem M Günther, G Prokert SIAM journal on mathematical analysis 38 (4), 1154-1185, 2006 | 12 | 2006 |
Classical solutions for a one-phase osmosis model F Lippoth, G Prokert Journal of Evolution Equations 12, 413-434, 2012 | 11 | 2012 |
On Stokes flow with variable and degenerate surface tension coefficient M Günther, G Prokert Nonlinear Differential Equations and Applications NoDEA 12, 21-60, 2005 | 11 | 2005 |
Stability of the equilibria for spatially periodic flows in porous media J Escher, G Prokert Nonlinear Analysis: Theory, Methods & Applications 45 (8), 1061-1080, 2001 | 11 | 2001 |
On the existence of solutions in plane quasistationary Stokes flow driven by surface tension G Prokert European Journal of Applied Mathematics 6 (5), 539-558, 1995 | 11 | 1995 |
Modelling fungal hypha tip growth via viscous sheet approximation TG de Jong, J Hulshof, G Prokert Journal of theoretical biology 492, 110189, 2020 | 10 | 2020 |
On evolution equations for moving domains G Prokert Zeitschrift für Analysis und ihre Anwendungen 18 (1), 67-95, 1999 | 10 | 1999 |
Two-phase Stokes flow by capillarity in the plane: The case of different viscosities BV Matioc, G Prokert Nonlinear Differential Equations and Applications NoDEA 29 (5), 54, 2022 | 8 | 2022 |
On travelling-wave solutions for a moving boundary problem of Hele–Shaw type M Günther, G Prokert IMA journal of applied mathematics 74 (1), 107-127, 2009 | 7 | 2009 |
Well-posedness for a moving boundary model of an evaporation front in a porous medium F Lippoth, G Prokert Journal of Mathematical Fluid Mechanics 21 (3), 40, 2019 | 5 | 2019 |
A moving boundary problem for the Stokes equations involving osmosis: Variational modelling and short-time well-posedness F Lippoth, MA Peletier, G Prokert European Journal of Applied Mathematics 27 (4), 647-666, 2016 | 5 | 2016 |
Stability of equilibria for a two-phase osmosis model F Lippoth, G Prokert Nonlinear Differential Equations and Applications NoDEA 21, 129-148, 2014 | 5 | 2014 |