Effective Permeabilities for Flow through Anisotropic Microscopic Geometries
Please login to view abstract download link
This work develops a computational and theoretical framework for determining effective permeabilities in anisotropic microscopic geometries containing dense, fibre-like obstacles, motivated by the need to model flow in coiled aneurysm domains accurately [1]. Building on homogenisation theory and fully resolved simulations in Representative Elementary Volumes (REVs), we validate the permeability model introduced in [2] and propose a systematic methodology for capturing the directional variations induced by fibre orientation. The resulting permeability tensors based on only two directions (parallel and perpendicular to the fibres) are incorporated into macroscopic flow simulations based on the Darcy equation, enabling direct comparison of anisotropic and isotropic permeability models across several benchmark configurations. Our findings show that anisotropy has a significant impact on local flow direction and magnitude, generating directional permeability contrasts which cannot be reproduced by classical isotropic approximations. By integrating coil-induced microstructural effects into continuum-scale hemodynamic models, the proposed approach enables more realistic assessment of post-treatment aneurysm flow behaviour. Beyond this clinical application, the framework is broadly applicable to other biomedical and engineering systems involving fibrous or filamentous porous microstructures. [1] Balazi L., Holzberger F., Lunowa S. B., Peter M. A., Peterseim D., Wohlmuth B., Effective permeabilities for flow through anisotropic microscopic geometries, arXiv, https://arxiv.org/abs/2512.04133, 2025. [2] Boutin C., Study of permeability by periodic and self-consistent homogenisation, Eur. J. Mech. A Solids, 19(4):603–632, 2000.
