期刊
ENGINEERING ANALYSIS WITH BOUNDARY ELEMENTS
卷 107, 期 -, 页码 168-184出版社
ELSEVIER SCI LTD
DOI: 10.1016/j.enganabound.2019.06.007
关键词
The damped Kuramoto-Sivashinsky equation; Two-dimensional spaces; Radial basis function-generated finite difference scheme; Shape parameter; Exponential Runge-Kutta time discretization; Penta-hepta defect pattern
We apply a numerical scheme based on a meshless method in space and an explicit exponential Runge-Kutta in time for the solution of the damped Kuramoto-Sivashinsky equation in two-dimensional spaces. The proposed meshless method is radial basis function-generated finite difference, which approximates the derivatives of the unknown function with respect to the spatial variables by a linear combination of the function values at given points in the domain and weights. Also, in this approach there is no need a mesh or triangulation for approximation. For each point, the weights are computed separately in its local sub-domain by solving a small radial basis function interpolant. Besides, a numerical algorithm based on singular value decomposition of the local radial basis function interpolation matrix [59] is applied to find the suitable shape parameter for each interpolation problem. We also consider an explicit time discretization based on exponential Runge-Kutta scheme such that its stability region is bigger than the classical form of Runge-Kutta method. Some numerical simulations are provided on the square, circular and annular domains to show the capability of the numerical scheme proposed here.
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