Analysis of fully discrete FEM for miscible displacement in porous media with Bear--Scheidegger diffusion tensor

Abstract

Fully discrete Galerkin finite element methods are studied for the equations of miscible displacement in porous media with the commonly-used Bear--Scheidegger diffusion-dispersion tensor: D( u) = γdm I + | u|( αT I + (αL - αT) u u| u|2) \, . Previous works on optimal-order L∞(0,T;L2)-norm error estimate required the regularity assumption ∇x∂tD( u(x,t)) ∈ L∞(0,T;L∞(Ω)), while the Bear--Scheidegger diffusion-dispersion tensor is only Lipschitz continuous even for a smooth velocity field u. In terms of the maximal Lp-regularity of fully discrete finite element solutions of parabolic equations, optimal error estimate in Lp(0,T;Lq)-norm and almost optimal error estimate in L∞(0,T;Lq)-norm are established under the assumption of D( u) being Lipschitz continuous with respect to u.