A residual-based a posteriori error estimator is proven reliable and efficient for enriched Galerkin methods applied to linear parabolic equations, enabling effective adaptive mesh refinement.
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Pith papers citing it
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math.NA 2years
2026 2verdicts
UNVERDICTED 2representative citing papers
The authors propose a local thermal non-equilibrium model with three temperatures coupled via a concentration variable for injected fluid, discretized with enriched Galerkin finite elements and flux-corrected transport to accurately simulate thermal breakthrough in EGS.
citing papers explorer
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A Posteriori Error Estimation for Parabolic Equations with Enriched Galerkin Finite Element Methods
A residual-based a posteriori error estimator is proven reliable and efficient for enriched Galerkin methods applied to linear parabolic equations, enabling effective adaptive mesh refinement.
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Heat Transfer Modeling in Enhanced Geothermal Energy: A Three-Temperature Approach for Solid, Injected, and Residing Fluids
The authors propose a local thermal non-equilibrium model with three temperatures coupled via a concentration variable for injected fluid, discretized with enriched Galerkin finite elements and flux-corrected transport to accurately simulate thermal breakthrough in EGS.