Existence of weak solutions is proved for the unsteady Darcy-Brinkman problem coupled to miscible reactive flows, with global existence when initial concentration is between 0 and 1, finite-time blow-up when above 1, uniqueness in 2D, and finite-element simulations confirming the behavior.
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2 Pith papers cite this work. Polarity classification is still indexing.
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Numerical simulations of a high-viscosity miscible blob in porous media show three deformation patterns and enhanced mixing at intermediate Péclet numbers and mobility ratios due to initial curvature.
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Existence and uniqueness of solutions of unsteady Darcy-Brinkman problem for modelling miscible reactive flows in porous media
Existence of weak solutions is proved for the unsteady Darcy-Brinkman problem coupled to miscible reactive flows, with global existence when initial concentration is between 0 and 1, finite-time blow-up when above 1, uniqueness in 2D, and finite-element simulations confirming the behavior.
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Towards enhanced mixing of a high viscous miscible blob in porous media
Numerical simulations of a high-viscosity miscible blob in porous media show three deformation patterns and enhanced mixing at intermediate Péclet numbers and mobility ratios due to initial curvature.