Article ID | Journal | Published Year | Pages | File Type |
---|---|---|---|---|
4526202 | Advances in Water Resources | 2011 | 10 Pages |
The tightly coupled, strongly nonlinear nature of non-isothermal multi-phase flow in porous media poses a tough challenge for numerical simulation. This trait is even more pronounced, if miscibility is also considered. A primary reason why inclusion of miscibility tends to be problematic are the difficulties stemming from phase transitions: on the one hand, phase transitions need to be included since the presence or absence of fluid phases has a major impact on the flow behavior; on the other hand, convergence of the nonlinear solver may be severely affected if they are not handled robustly.In this work, we present a mathematically sound approach to include phase transitions in the nonlinear system of equations: first, the transition conditions are formulated as a set of local inequality constraints, which are then directly integrated into the nonlinear solver using a nonlinear complementarity function. Under this scheme, Newton–Raphson solvers exhibit considerably more robust convergence behaviour compared to some previous approaches, which is then illustrated by several numerical examples.
► New approach for miscible multi-phase flow in porous media using non-linear complementarity functions. ► Much increased robustness compared to primary variable switching models. ► Same physical accuracy as previous approaches. ► Feasible for thermodynamically challenging problems.