Krylov single-step implicit integration factor WENO methods for advection-diffusion-reaction equations
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Publication:2375021
DOI10.1016/j.jcp.2016.01.021zbMath1349.65306OpenAlexW2288540620MaRDI QIDQ2375021
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.2016.01.021
weighted essentially non-oscillatory schemesKrylov subspace approximationadvection-diffusion-reaction equationsimplicit integration factor methodssingle-step methods
Related Items (15)
Krylov implicit integration factor methods for semilinear fourth-order equations ⋮ Efficient dissipation-preserving scheme for the damped nonlinear Schrödinger equation in three dimensions ⋮ Efficient schemes for the damped nonlinear Schrödinger equation in high dimensions ⋮ Fast compact implicit integration factor method with non-uniform meshes for the two-dimensional nonlinear Riesz space-fractional reaction-diffusion equation ⋮ Computational complexity study on Krylov integration factor WENO method for high spatial dimension convection-diffusion problems ⋮ High accuracy compact difference and multigrid methods for two-dimensional time-dependent nonlinear advection-diffusion-reaction problems ⋮ A second order directional split exponential integrator for systems of advection-diffusion-reaction equations ⋮ Stability of linear multistep time iterations with the WENO5 discretization at discontinuities ⋮ Krylov implicit integration factor discontinuous Galerkin methods on sparse grids for high dimensional reaction-diffusion equations ⋮ A fast compact exponential time differencing method for semilinear parabolic equations with Neumann boundary conditions ⋮ High order integration factor methods for systems with inhomogeneous boundary conditions ⋮ Krylov integration factor method on sparse grids for high spatial dimension convection-diffusion equations ⋮ Fast sparse grid simulations of fifth order WENO scheme for high dimensional hyperbolic PDEs ⋮ Krylov implicit integration factor method for a class of stiff reaction-diffusion systems with moving boundaries ⋮ Efficient dissipation-preserving approaches for the damped nonlinear Schrödinger equation
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Cites Work
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