Article ID Journal Published Year Pages File Type
4525899 Advances in Water Resources 2012 11 Pages PDF
Abstract

As an alternative to grid refinement, the concept of a ghost node, which was developed for nested grid applications, has been extended towards improving sub-grid scale accuracy of flow to conduits, wells, rivers or other boundary features that interact with a finite-difference groundwater flow model. The formulation is presented for correcting the regular finite-difference groundwater flow equations for confined and unconfined cases, with or without Newton Raphson linearization of the nonlinearities, to include the Ghost Node Correction (GNC) for location displacement. The correction may be applied on the right-hand side vector for a symmetric finite-difference Picard implementation, or on the left-hand side matrix for an implicit but asymmetric implementation. The finite-difference matrix connectivity structure may be maintained for an implicit implementation by only selecting contributing nodes that are a part of the finite-difference connectivity. Proof of concept example problems are provided to demonstrate the improved accuracy that may be achieved through sub-grid scale corrections using the GNC schemes.

► Nested grid concepts extended for sub-grid scale accuracy of boundary placement. ► Formulation is amenable for extension of existing finite-difference codes. ► Example problems demonstrate that conductance weighted schemes are most accurate.

Related Topics
Physical Sciences and Engineering Earth and Planetary Sciences Earth-Surface Processes
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