Abstract
In this study, we developed a novel boundary-type meshless approach for dealing with two-dimensional transient flows in heterogeneous layered porous media. The novelty of the proposed method is that we derived the Trefftz space–time basis function for the two-dimensional diffusion equation in layered porous media in the space–time domain. The continuity conditions at the interface of the subdomains were satisfied in terms of the domain decomposition method. Numerical solutions were approximated based on the superposition principle utilizing the space–time basis functions of the governing equation. Using the space–time collocation scheme, the numerical solutions of the problem were solved with boundary and initial data assigned on the space–time boundaries, which combined spatial and temporal discretizations in the space–time manifold. Accordingly, the transient flows through the heterogeneous layered porous media in the space–time domain could be solved without using a time-marching scheme. Numerical examples and a convergence analysis were carried out to validate the accuracy and the stability of the method. The results illustrate that an excellent agreement with the analytical solution was obtained. Additionally, the proposed method was relatively simple because we only needed to deal with the boundary data, even for the problems in the heterogeneous layered porous media. Finally, when compared with the conventional time-marching scheme, highly accurate solutions were obtained and the error accumulation from the time-marching scheme was avoided.
Highlights
The proposed method combines the conventional Trefftz method with the space–time collocation scheme, such that no inner points are required in the analysis and all collocation points needed to place the space–time boundaries are presented for the modeling of the two-dimensional transient flows in the heterogeneous layered porous media
A novel meshless method for dealing with two-dimensional transient flows in heterogeneous layered porous media is presented in this article
Numerical solutions are approximated based on the superposition principle adopting the space–time basis functions of the diffusion equation
Summary
Publisher’s Note: MDPI stays neutral with regard to jurisdictional claims in published maps and institutional affiliations. Of the wide variety of meshfree approaches, the Trefftz method is one of the widespread boundary-type meshless methods for dealing with steady-state Laplace-type problems, where computed results are approximated as a series of basis functions, completely satisfying the governing. A study on modeling the subsurface flow problems with transient moving boundaries utilizing the Trefftz method was developed [12]. The engineering applications of the Trefftz method with complete Trefftz functions for dealing with transient fluid flow through heterogeneous porous media have been less studied, which is what initiated this research. A novel meshless approach for modeling transient flows in heterogeneous layered porous media is developed. We developed a boundary-type meshless method combining the conventional Trefftz method with the space–time collocation scheme.
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