CPDES2: A preconditioned conjugate gradient solver for linear asymmetric matrix equations arising from coupled partial differential equations in two dimensions Many physical problems require the solution of coupled partial differential equations (PDE’s) on two-dimensional domains. When the time scales of interest dictate an implicit discretization of the equations a rather complicated global matrix system needs solution. The exact form of the matrix depends on the choice of spatial grids and on the finite element or finite difference approximations employed. CPDES2 allows each spatial operator to have 5 or 9 point stencils and allows for general couplings between all of the component PDE’s and it automatically generates the matrix structures needed to perform the algorithm.par The resulting sparse matrix equation is solved by either the preconditioned conjugate gradient method or by the preconditioned biconjugate gradient algorithm. An arbitrary number of component equations are permitted only limited by available memory. In the sub-band representation used, we generate an algorithm that is written compactly in terms of indirect indices which is vectorizable on some of the newer scientific computers. (Source: http://cpc.cs.qub.ac.uk/summaries/)
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References in zbMATH (referenced in 1 article , 1 standard article )
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- Anderson, D.V.; Koniges, A.E.; Shumaker, D.E.: CPDES2: A preconditioned conjugate gradient solver for linear asymmetric matrix equations arising from coupled partial differential equations in two dimensions (1988)