Quarter-sweep iterative alternating decomposition explicit algorithm applied to diffusion equations
نویسندگان
چکیده
منابع مشابه
Quarter-sweep iterative alternating decomposition explicit algorithm applied to diffusion equations
The aim of this article is to describe the formulation of the quarter-sweep iterative alternating decomposition explicit (QSIADE) method using the finite difference approach for solving one-dimensional diffusion equations. The concept of the QSIADE method is inspired via combination between the quarter-sweep iterative and the iterative alternating decomposition explicit (IADE) methods known as ...
متن کاملQuarter-sweep iterative alternating decomposition explicit algorithm applied to diffusion equations
The aim of this article is to describe the formulation of the quarter-sweep iterative alternating decomposition explicit (QSIADE) method using the finite difference approach for solving one-dimensional diffusion equations. The concept of the QSIADE method is inspired via combination between the quarter-sweep iterative and the iterative alternating decomposition explicit (IADE) methods known as ...
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Iterative methods particularly the Two Parameter Alternating Group Explicit (TAGE) methods are used to solve system of linear equations generated from the discretization of two-point fuzzy boundary value problems (FBVPs). The formulation and implementation of the Full-Sweep TAGE (FSTAGE) and Half-Sweep TAGE (HSTAGE) methods are also presented. Then numerical experiments are carried out onto two...
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In this paper, based on an unconditionally stable finite difference implicit scheme, we present a concept of deriving a class of effective alternating group explicit iterative method(AGEI) for periodic boundary value problem of convection-diffusion equations, and then give two AGEI methods. The AGEI methods are verified to be convergent, and have the property of parallelism. Results of numerica...
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In previous studies, the efficiency of the Half-Sweep Multigrid method has been shown to be very fast as compared with the standard Multigrid method. This is due to its ability to reduce computational complexity of the standard method. In this paper, the primary goal is to purpose the Half-Sweep Algebraic Multigrid (HSAMG) method using the HSCN finite difference scheme for solving one-dimension...
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ژورنال
عنوان ژورنال: International Journal of Computer Mathematics
سال: 2004
ISSN: 0020-7160,1029-0265
DOI: 10.1080/00207160412331291125