The finite volume method is the favoured numerical technique for solving (possibly coupled, nonlinear, anisotropic) diffusion equations. The method transforms the original problem into a system of nonlinear, algebraic equations through the process of discretisation. The accuracy of this discretisation determines to a large extent the accuracy of the final solution.\ud\udA new method of discretisation is presented, designed to achieve high accuracy without imposing excessive computational requirements. In particular, the method employs radial basis functions as a means of local gradient interpolation. When combined with high order Gaussian quadrature integration methods, the interpolation based on radial basis functions produces an efficient and accurate discretisation.\ud\udThe resulting nonlinear, algebraic system is solved efficiently using a Jacobian-free Newton–Krylov method. Information obtained from the Newton–Krylov iterations is used to construct an effective preconditioner in order to reduce the number of nonlinear iterations required to achieve an accurate solution.\ud\udResults to date have been promising, with the method giving accuracy several orders of magnitude better than simpler methods based on shape functions for both linear and nonlinear diffusion problems.
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机译:有限体积法是求解(可能是耦合的,非线性的,各向异性的)扩散方程的首选数值技术。该方法通过离散化过程将原始问题转换为非线性代数方程组。这种离散化的准确性在很大程度上决定了最终解决方案的准确性。\ ud \ ud提出了一种离散化的新方法,该方法旨在在不施加过多计算要求的情况下实现高精度。特别地,该方法采用径向基函数作为局部梯度插值的手段。当与高阶高斯积分积分方法结合使用时,基于径向基函数的插值可产生有效且精确的离散化。\ ud \ ud使用无Jacobian的Newton-Krylov方法可有效求解所得的非线性代数系统。从牛顿-克里洛夫(Newton-Krylov)迭代获得的信息用于构造有效的预处理器,以减少实现精确解所需的非线性迭代次数。\ ud \ ud迄今为止的结果令人鼓舞,该方法给出的精度为几个数量级。优于基于形状函数的简单方法,可解决线性和非线性扩散问题。
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