Global existence of strong solutions to a groundwater flow problem

Abstract

In this paper we study the initial boundary value problem for the system v= ux1,\ ut-div(((a|q|+m)I+(b-a)qq|q|)∇ u)=-∇ u·q, where q=(-vx2, vx1)T, qq=qqT. This problem has been proposed as a model for a fluid flowing through a porous medium under the influence of gravity and hydrodynamic dispersion. For each T>0 we obtain a so-called strong solution (v, u) in the function space L∞(0,T; (W1,∞())2), where is a bounded domain in R2. The key ingredient in our approach is the decomposition A2=tr (A)A-det(A) I for any 2× 2 symmetric matrix A. By exploring this decomposition, we are able to derive an equation of parabolic type for the function (((a|q|+m)I+(b-a)qq|q|)∇ u·∇ u)j, j≥ 1. With the aid of this equation we obtain a uniform bound for ∇ u.