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A mass-transfer particle-tracking method for simulating transport with discontinuous diffusion coefficients

journal contribution
posted on 2020-11-17, 00:00 authored by Diogo BolsterDiogo Bolster, Michael J. Schmidt, Nicholas B. Engdahl, Stephen D. Pankavich
The problem of a spatially discontinuous diffusion coefficient (D(x)) is one that may be encountered in hydrogeologic systems due to natural geological features or as a consequence of numerical discretization of flow properties. To date, mass-transfer particle-tracking (MTPT) methods, a family of Lagrangian methods in which diffusion is jointly simulated by random walk and diffusive mass transfers, have been unable to solve this problem. This manuscript presents a new mass-transfer (MT) algorithm that enables MTPT methods to accurately solve the problem of discontinuous D(x). To achieve this, we derive a semi-analytical solution to the discontinuous D(x) problem by employing a predictor-corrector approach, and we use this semi-analytical solution as the weighting function in a reformulated MT algorithm. This semi-analytical solution is generalized for cases with multiple 1D interfaces as well as for 2D cases, including a 2 x 2 filing of 4 subdomains that corresponds to a numerically-generated diffusion field. The solutions generated by this new mass-transfer algorithm closely agree with an analytical 1D solution or, in more complicated cases, trusted numerical results, demonstrating the success of our proposed approach.

History

Date Created

2020-06-01

Date Modified

2020-11-17

Language

  • English

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All rights reserved.

Publisher

Advances In Water Resources

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    Environmental Change Initiative

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