On existence and uniqueness for a coupled system modeling immiscible flow through a porous medium |
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| Authors: | Koffi B. Fadimba |
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| Affiliation: | Department of Mathematical Sciences, University of South Carolina Aiken, 471 University Parkway, Aiken, SC 29801, USA |
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| Abstract: | ![]()
We consider a system of nonlinear coupled partial differential equations that models immiscible two-phase flow through a porous medium. A primary difficulty with this problem is its degenerate nature. Under reasonable assumptions on the data, and for appropriate boundary and initial conditions, we prove the existence of a weak solution to the problem, in a certain sense, using a compactness argument. This is accomplished by regularizing the problem and proving that the regularized problem has a unique solution which is bounded independently of the regularization parameter. We also establish a priori estimates for uniqueness of a solution. |
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| Keywords: | Porous media Two-phase flow Regularization Nonlinear partial differential equation Existence of a solution Fixed point theorem Coupled system Degenerate parabolic equation |
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