Add to ORKGThe low-Reynolds-number, Stokes-flow equations are solved in a wedge-shaped region bounded by a moving wall and a stress-free meniscus. The moving-contact-line singularity is removed by invoking the yield-stress boundary condition. A solution is found by Mellin transformation, followed by application of the Wiener-Hopf method. Formulae are obtained for the length of the slip region and for the surface shear stress, both as functions of the contact angle. The role of the present analysis as an inner solution for more general cases of flow near moving menisci is discussed. 1
In this paper, we study two-dimensional Stokes flow between sinusoidal walls. A stream function is i...
The problem of the moving contact line between two immiscible fluids on a smooth surface is revisite...
An analytical method to find the flow generated by the basic singularities of Stokes flow in a wedge...
Abstract The motion of a spherical particle in infinite linear flow and near a plane wall, subject t...
For contact line motion where the full Stokes flow equations hold, full matched asymptotic solutions...
The influence of different boundary conditions applied in the contact line region on the outer menis...
Singular solutions of the Stokes equations play important roles in a variety of fluid dynamics probl...
this paper we consider a three-dimensional Stokes flow problem in which a hemispherical bump is intr...
The numerical solution of Stokes flow in a two dimensional channel in which a segment of one wall is...
International audienceConsider a suspension of dilute spherical particles transported in the flow of...
We consider the evolution of contact lines for viscous fluids in a two-dimensional open-top vessel. ...
Two-phase fluid flows on substrates (i.e. wetting phenomena) are important in many industrial proces...
AbstractThe governing equations for Stokes flow are formulated in terms of a stream function and Air...
The physical processes near a moving contact line are investigated systematically using molecular dy...
We give a general solution of Stokes equations for an incompressible, viscous flow past a sphere wit...
In this paper, we study two-dimensional Stokes flow between sinusoidal walls. A stream function is i...
The problem of the moving contact line between two immiscible fluids on a smooth surface is revisite...
An analytical method to find the flow generated by the basic singularities of Stokes flow in a wedge...
Abstract The motion of a spherical particle in infinite linear flow and near a plane wall, subject t...
For contact line motion where the full Stokes flow equations hold, full matched asymptotic solutions...
The influence of different boundary conditions applied in the contact line region on the outer menis...
Singular solutions of the Stokes equations play important roles in a variety of fluid dynamics probl...
this paper we consider a three-dimensional Stokes flow problem in which a hemispherical bump is intr...
The numerical solution of Stokes flow in a two dimensional channel in which a segment of one wall is...
International audienceConsider a suspension of dilute spherical particles transported in the flow of...
We consider the evolution of contact lines for viscous fluids in a two-dimensional open-top vessel. ...
Two-phase fluid flows on substrates (i.e. wetting phenomena) are important in many industrial proces...
AbstractThe governing equations for Stokes flow are formulated in terms of a stream function and Air...
The physical processes near a moving contact line are investigated systematically using molecular dy...
We give a general solution of Stokes equations for an incompressible, viscous flow past a sphere wit...
In this paper, we study two-dimensional Stokes flow between sinusoidal walls. A stream function is i...
The problem of the moving contact line between two immiscible fluids on a smooth surface is revisite...
An analytical method to find the flow generated by the basic singularities of Stokes flow in a wedge...