Fast and high-order difference schemes for the fourth-order fractional sub-diffusion equations with spatially variable coefficient under the first Dirichlet boundary conditions
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Publication:2664731
DOI10.1016/j.matcom.2021.02.017OpenAlexW3132341234MaRDI QIDQ2664731
Publication date: 18 November 2021
Published in: Mathematics and Computers in Simulation (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.matcom.2021.02.017
stabilityconvergenceCaputo derivativevariable coefficientfast calculationfirst Dirichlet boundary conditions
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Finite difference schemes for the fourth‐order parabolic equations with different boundary value conditions ⋮ The compact difference approach for the fourth‐order parabolic equations with the first Neumann boundary value conditions ⋮ An operator splitting method for multi-asset options with the Feynman-Kac formula
Cites Work
- Unnamed Item
- Unnamed Item
- A compact difference scheme for fractional sub-diffusion equations with the spatially variable coefficient under Neumann boundary conditions
- A new difference scheme for the time fractional diffusion equation
- On finite difference methods for fourth-order fractional diffusion-wave and subdiffusion systems
- Initial-boundary-value problems for the generalized multi-term time-fractional diffusion equation
- A parallel-in-time iterative algorithm for Volterra partial integro-differential problems with weakly singular kernel
- A multi-term fractional diffusion equation for oxygen delivery through a capillary to tissues
- Efficient numerical schemes for fractional sub-diffusion equation with the spatially variable coefficient
- A second-order compact difference scheme for the fourth-order fractional sub-diffusion equation
- New compact difference scheme for solving the fourth-order time fractional sub-diffusion equation of the distributed order
- A compact finite difference scheme for the fourth-order fractional diffusion-wave system
- Numerical methods for time-fractional evolution equations with nonsmooth data: a concise overview
- Numerical algorithms with high spatial accuracy for the fourth-order fractional sub-diffusion equations with the first Dirichlet boundary conditions
- Stability of fully discrete schemes with interpolation-type fractional formulas for distributed-order subdiffusion equations
- A mathematical model for atmospheric ice accretion and water flow on a cold surface
- An analysis of the L1 scheme for the subdiffusion equation with nonsmooth data
- Error Analysis of a High Order Method for Time-Fractional Diffusion Equations
- The flow and solidification of a thin fluid film on an arbitrary three-dimensional surface
- Sharp Error Estimate of the Nonuniform L1 Formula for Linear Reaction-Subdiffusion Equations
- A Second-Order Accurate Implicit Difference Scheme for Time Fractional Reaction-Diffusion Equation with Variable Coefficients and Time Drift Term
- A COMPACT DIFFERENCE SCHEME FOR FOURTH-ORDER FRACTIONAL SUB-DIFFUSION EQUATIONS WITH NEUMANN BOUNDARY CONDITIONS
- Fast Evaluation of the Caputo Fractional Derivative and its Applications to Fractional Diffusion Equations: A Second-Order Scheme
- Error Analysis of a Finite Difference Method on Graded Meshes for a Time-Fractional Diffusion Equation
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