Non-monotonic Travelling Wave Fronts in a System of Fractional Flow Equations from Porous Media

Publication date

2016

Authors

Zegeling, Paul AndriesISNI 0000000039492568
Hönig, O.
Doster, F.
Hilfer, R.

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Article
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Abstract

Motivated by observations of saturation overshoot, this article investigates generic classes of smooth travelling wave solutions of a system of two coupled nonlinear parabolic partial differential equations resulting from a flux function of high symmetry. All boundary resp. limit value problems of the travelling wave ansatz, which lead to smooth travelling wave solutions, are systematically explored. A complete, visually and computationally useful representation of the five-dimensional manifold connecting wave velocities and boundary resp. limit data is found by using methods from dynamical systems theory. The travelling waves exhibit monotonic, non-monotonic or plateau-shaped behaviour. Special attention is given to the non-monotonic profiles. The stability of the travelling waves is studied by numerically solving the full system of the partial differential equations with an efficient and accurate adaptive moving grid solver.

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Citation

Zegeling, P A, Hönig, O, Doster, F & Hilfer, R 2016, 'Non-monotonic Travelling Wave Fronts in a System of Fractional Flow Equations from Porous Media', Transport in Porous Media, vol. 114, no. 2, pp. 309-340. https://doi.org/10.1007/s11242-015-0618-2