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Three-Field Block Preconditioners for Models of Coupled Magma/Mantle Dynamics

2015; Society for Industrial and Applied Mathematics; Volume: 37; Issue: 5 Linguagem: Inglês

10.1137/14099718x

1095-7197

Sander Rhebergen, Garth N. Wells, Andrew J. Wathen, Richard F. Katz,

Matrix Theory and Algorithms

For a prescribed porosity, the coupled magma/mantle flow equations can be formulated as a two-field system of equations with velocity and pressure as unknowns. Previous work has shown that while optimal preconditioners for the two-field formulation can be obtained, the construction of preconditioners that are uniform with respect to model parameters is difficult. This limits the applicability of two-field preconditioners in certain regimes of practical interest. We address this issue by reformulating the governing equations as a three-field problem, which removes a term that was problematic in the two-field formulation in favor of an additional equation for a pressure-like field. For the three-field problem, we develop and analyze new preconditioners and we show numerically that they are optimal in terms of problem size and less sensitive to model parameters, compared to the two-field preconditioner. This extends the applicability of optimal preconditioners for coupled mantle/magma dynamics into parameter regimes of physical interest.