The iteration is generally continued until the changes made by an iteration are below some tolerance. Thus, unlike the Jacobi method, we do not have to do any vector copying should we wish to use only one storage vector. While this might seem like a rather minor concern, for large systems it is unlikely that every iteration can be stored. This means that no additional storage is required, and the computation can be done in place ( replaces ). Note that the computation of uses only those elements of that have already been computed and only those elements of that have yet to be advanced to iteration. Rather, an element-based approach is used: This matrix expression is mainly of academic interest, and is not used to program the method. Where and, , and represent the diagonal, lower triangular, and upper triangular parts of the coefficient matrix. In matrix terms, the the Gauss-Seidel iteration can be expressed as We seek the solution to a set of linear equations: The method is similar to the Jacobi method and in the same way strict or irreducible diagonal dominance of the system is sufficient to ensure convergence, meaning the method will work. The method is named after the German mathematician Carl Friedrich Gauss and Philipp Ludwig von Seidel. The Gauss-Seidel method is a technique used to solve a linear system of equations. Gauss-Seidel method - CFD-Wiki, the free CFD reference
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