Regularity of the diffusion-dispersion tensor and error analysis of Galerkin FEMs for a porous media flow

Abstract

We study Galerkin finite element methods for an incompressible miscible flow in porous media with the commonly-used Bear-Scheidegger diffusion-dispersion tensor D( u) = Φdm I + | u| ( αT I + (αL - αT) u u| u|2). The traditional approach to optimal L∞((0,T);L2) error estimates is based on an elliptic Ritz projection, which usually requires the regularity of ∇x∂tD( u(x,t)) ∈ Lp(ΩT). However, the Bear-Scheidegger diffusion-dispersion tensor may not satisfy the regularity condition even for a smooth velocity field u. A new approach is presented in this paper, in terms of a parabolic projection, which only requires the Lipschitz continuity of D( u). With the new approach, we establish optimal Lp((0,T);Lq) error estimates and an almost optimal L∞((0,T);L∞) error estimate.