Block-centered finite difference methods for general Darcy–Forchheimer problems

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摘要

Block-centered finite difference methods are constructed to solve the general Darcy–Forchheimer problems with Neumann boundary conditions, in which the velocity and pressure can be approximated simultaneously. We demonstrate that with sufficiently smooth analytical solution, the errors for both pressure and velocity in discrete L2-norms are second-order accurate on a nonuniform rectangular grid. Numerical experiments carried out using the scheme show the consistency of the convergence rates of our method with the theoretical analysis.

论文关键词:Block-centered finite difference,General Darcy–Forchheimer problems,Numerical analysis,Second-order accuracy

论文评审过程:Received 15 November 2015, Revised 13 July 2016, Accepted 28 February 2017, Available online 21 March 2017, Version of Record 21 March 2017.

论文官网地址:https://doi.org/10.1016/j.amc.2017.02.036