Analysis of miscible displacement through porous media with vanishing molecular diffusion and singular wells

TL;DR

This paper establishes the existence of solutions for a model of incompressible miscible displacement in porous media with zero molecular diffusion and singular wells, using advanced compactness and convergence techniques.

Contribution

It introduces a novel approach to handle the diffusion-dispersion term and singular wells, extending previous methods to cases with vanishing molecular diffusion.

Findings

Proved existence of solutions with zero molecular diffusion

Developed a new treatment for the diffusion-dispersion term

Applied compensated compactness and Aubin--Simon lemma techniques

Abstract

This article proves the existence of solutions to a model of incompressible miscible displacement through a porous medium, with zero molecular diffusion and modelling wells by spatial measures. We obtain the solution by passing to the limit on problems indexed by vanishing molecular diffusion coefficients. The proof employs cutoff functions to excise the supports of the measures and the discontinuities in the permeability tensor, thus enabling compensated compactness arguments used by Y. Amirat and A. Ziani for the analysis of the problem with $L^2$ wells [\emph{Z. Anal. Anwendungen}, 23(2):335--351, 2004]. We give a novel treatment of the diffusion-dispersion term, which requires delicate use of the Aubin--Simon lemma to ensure the strong convergence of the pressure gradient, owing to the troublesome lower-order terms introduced by the localisation procedure.