Abstract
The appropriate boundary condition between an unconfined incompressible viscous fluid and a porous medium is given by the law of Beavers and Joseph. The latter has been justified both experimentally and mathematically, using the method of periodic homogenization. However, all results so far deal only with the case of a planar boundary. In this work, we consider the case of a curved, macroscopically periodic boundary. By using a coordinate transformation, we obtain a description of the flow in a domain with a planar boundary, for which we derive the effective behavior: The effective velocity is continuous in normal direction. Tangential to the interface, a slip occurs. Additionally, a pressure jump occurs. The magnitude of the slip velocity as well as the jump in pressure can be determined with the help of a generalized boundary layer function. The results indicate the validity of a generalized Beavers-and-Joseph-type law, where the geometry of the interface has an influence on the slip and jump constants.
| Originalsprog | Engelsk |
|---|---|
| Tidsskrift | SIAM Journal on Applied Mathematics |
| Vol/bind | 75 |
| Udgave nummer | 3 |
| Sider (fra-til) | 953-977 |
| Antal sider | 25 |
| ISSN | 0036-1399 |
| DOI | |
| Status | Udgivet - 2015 |
Emneord
- Beavers- Joseph-Saffman condition
- Fluid mechanics
- Homogenization
- Interfacial exchange
- Porous media