M
Mary F. Wheeler
Researcher at University of Texas at Austin
Publications - 501
Citations - 20139
Mary F. Wheeler is an academic researcher from University of Texas at Austin. The author has contributed to research in topics: Finite element method & Galerkin method. The author has an hindex of 70, co-authored 488 publications receiving 18290 citations. Previous affiliations of Mary F. Wheeler include International Council for the Exploration of the Sea & University of Texas System.
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Phase-field modeling of a fluid-driven fracture in a poroelastic medium
TL;DR: In this article, a phase field variational inequality was proposed for a fluid-driven fracture in a poroelastic medium, where the phase field variable was determined simultaneously with the displacement and phase field, and a solution to the incremental problem was established through convergence of a finite dimensional approximation.
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Balancing domain decomposition for mixed finite elements
TL;DR: Computational results from a message passing parallel implementation on an INTEL-Delta machine demonstrate the scalability properties of the Balancing Domain Decomposition method and show almost optimal linear observed speed-up for up to 64 processors.
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Mortar Upscaling for Multiphase Flow in Porous Media
TL;DR: This methodology has been implemented in the Center for Subsurface Modeling's multiphysics multiblock simulator IPARS (Integrated Parallel Accurate reservoir Simulator), and it can be applied to non-matching grids across the interface, multinumerics and multiph physics models, and mortar adaptivity.
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Some improved error estimates for the modified method of characteristics
TL;DR: In this paper, improved error estimates for a finite-element modified method of characteristics for a coupled system of partial differential equations modeling flow in porous media were derived for a porous media.
Journal Article
Convergence of iterative coupling for coupled flow and geomechanics
Andro Mikelić,Mary F. Wheeler +1 more
TL;DR: The stability and convergence of two widely used schemes are demonstrated: the undrained split method and the fixed stress split method, for the first time that such results have been rigorously obtained and published in the scientific literature.