|کد مقاله||کد نشریه||سال انتشار||مقاله انگلیسی||ترجمه فارسی||نسخه تمام متن|
|4967054||1365153||2018||15 صفحه PDF||ندارد||دانلود کنید|
â¢A new iterative scheme for the discrete Smoluchowski equation is presented.â¢The numerical properties of the method are explored for a range of kernels.â¢The solver is extended to spatially dependent problems with non-uniform velocities.â¢It is suggested how the performance of the method could render it useful in CFD applications to industrial coagulation problems.
This paper introduces a new iterative scheme for solving the discrete Smoluchowski equation and explores the numerical convergence properties of the method for a range of kernels admitting analytical solutions, in addition to some more physically realistic kernels typically used in kinetics applications. The solver is extended to spatially dependent problems with non-uniform velocities and its performance investigated in detail.
Journal: Journal of Computational Physics - Volume 352, 1 January 2018, Pages 373-387