In this paper, we consider numerical algorithms for modeling of the time-dependent coupling between the fluid flow and deformation in elastic porous media. Here, we employ a four-field formulation which uses the total stress, displacement, flux, and pressure as its primary variables and satisfies Darcy's law and linear elasticity in mixed weak form. We present four different iteratively coupled methods, known as drained, undrained, fixed-strain, and fixed-stress splits, in which the diffusion operator is separated from the elasticity operator and the two subproblems are solved in a staggered way while ensuring convergence of the solution at each time step. A-priori convergence results for each iterative coupling which differs from those found when using a traditional two-field or three-field formulation are presented. We also present some numerical results to support the convergence estimates and to show the accuracy and efficiency of the algorithms.

• 出版日期2017-2-10