A conservative, positivity preserving scheme for reactive solute transport problems in moving domains
From MaRDI portal
Publication:349564
DOI10.1016/j.jcp.2014.07.049zbMath1349.65467OpenAlexW1976540774MaRDI QIDQ349564
Sibusiso Mabuza, Dmitri Kuzmin, Sunčica Čanić, Martina Bukač
Publication date: 5 December 2016
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2014.07.049
reactive transportarbitrary Lagrangian-Eulerian methodsconvection dominated flowflux corrected transport
Suspensions (76T20) Finite element, Rayleigh-Ritz and Galerkin methods for initial value and initial-boundary value problems involving PDEs (65M60) Transport processes in time-dependent statistical mechanics (82C70) Reaction effects in flows (76V05)
Related Items
A structure-preserving method for a class of nonlinear dissipative wave equations with Riesz space-fractional derivatives, A reduced proper orthogonal decomposition (POD) element free Galerkin (POD-EFG) method to simulate two-dimensional solute transport problems and error estimate, On the solution of hyperbolic two-dimensional fractional systems via discrete variational schemes of high order of accuracy, A two-scale iterative scheme for a phase-field model for precipitation and dissolution in porous media, A compact fourth-order in space energy-preserving method for Riesz space-fractional nonlinear wave equations, Modeling and analysis of reactive solute transport in deformable channels with wall adsorption–desorption
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A positivity-preserving ALE finite element scheme for convection-diffusion equations in moving domains
- Finite element methods for time-dependent convection-diffusion-reaction equations with small diffusion
- Fully multidimensional flux-corrected transport algorithms for fluids
- Linearity-preserving flux correction and convergence acceleration for constrained Galerkin schemes
- Rigorous upscaling of the reactive flow with finite kinetics and under dominant Péclet number
- Stable loosely-coupled-type algorithm for fluid-structure interaction in blood flow
- Fluid-structure partitioned procedures based on Robin transmission conditions
- Newton method for reactive solute transport with equilibrium sorption in porous media
- Explicit and implicit FEM-FCT algorithms with flux linearization
- Rigorous upscaling of the infinite adsorption rate reactive flow under dominant Peclet number through a pore
- A high-order conservative Patankar-type discretisation for stiff systems of production--destruction equations
- Longitudinal displacement in viscoelastic arteries: a novel fluid-structure interaction computational model, and experimental validation
- Existence of a weak solution to a nonlinear fluid-structure interaction problem modeling the flow of an incompressible, viscous fluid in a cylinder with deformable walls
- Existence and uniqueness of a solution to a three-dimensional axially symmetric biot problem arising in modeling blood flow
- Effective models for reactive flow under a dominant Péclet number and order one Damköhler number: numerical simulations
- Existence of a solution to a fluid-multi-layered-structure interaction problem
- On reactive solute transport through a curved pipe
- Stability analysis of second-order time accurate schemes for ALE-FEM
- Existence of a Unique Solution to a Nonlinear Moving-Boundary Problem of Mixed Type Arising in Modeling Blood Flow
- RIGOROUS DERIVATION OF A HYPERBOLIC MODEL FOR TAYLOR DISPERSION
- MODELING POLYMERIC CONTROLLED DRUG RELEASE AND TRANSPORT PHENOMENA IN THE ARTERIAL TISSUE
- Positivity and Conservation Properties of Some Integration Schemes for Mass Action Kinetics
- Finite Element Approximation of the Transport of Reactive Solutes in Porous Media. Part 1: Error Estimates for Nonequilibrium Adsorption Processes
- Dispersion in steady and oscillatory flows through a tube with reversible and irreversible wall reactions
- Implicit FEM-FCT algorithms and discrete Newton methods for transient convection problems
- Laplace transform approach to the rigorous upscaling of the infinite adsorption rate reactive flow under dominant Peclet number through a pore
- Finite element flux-corrected transport (FEM-FCT) for the euler and Navier-Stokes equations
- FEM-FCT: Combining unstructured grids with high resolution
- Positivity-preserving, flux-limited finite-difference and finite-element methods for reactive transport
- Dispersion of chemical solutes in chromatographs and reactors
- Rigorous Upscaling of the Reactive Flow through a Pore, under Dominant Peclet and Damkohler Numbers
- Solute dispersion in channels with periodically varying apertures
- Reactive Flow and Reaction-Induced Boundary Movement in a Thin Channel
- Analysis of a Stabilized Finite Element Approximation of the Transient Convection‐Diffusion Equation Using an ALE Framework
