Homogenization for a Variational Problem with a Slip Interface Condition

TL;DR

This paper investigates how slip interface conditions affect wave propagation in poroelastic composites, using homogenization and two-scale convergence to derive effective macroscopic models that account for slip effects at the micro-scale.

Contribution

It introduces a novel homogenization approach for poroelastic media with slip interface conditions involving both fluid and elastic phases.

Findings

Derived effective wave equations incorporating slip interface effects.

Showed that slip conditions significantly influence wave propagation characteristics.

Extended homogenization techniques to elastic-poroelastic interfaces with slip.

Abstract

Inspired by applications, we study the effect of interface slip on the effective wave propagation in poroelastic composites. The current literature on the homogenization for the poroelastic wave equations are all based on the no-slip interface condition posed on the micro-scale. However, for certain pore fluids, the no-slip conditions are known to be physically invalid. Even though there are results in a few papers regarding porous media with slip condition on the interface, they are for porous media with rigid solid matrix rather than an elastic one. For the former case, the equations for the micro-scale are posed only in the pore space and the slip on the interface involves only the fluid velocity and the fluid stress. For the latter case, both the fluid equations and the elastic equations are posed in the respective phases and the slip conditions involve the velocities on both sides of the interface, rather than just the fluid side. With this slip condition, a variational boundary value problem governing the small vibrations of a periodic mixture of an elastic solid and a slightly viscous fluid is studied in the paper. The method of two-scale convergence is used to obtain the macroscopic behavior of the solution and to identify the role played by the slip interface condition.