Title of article
Preconditioning by approximations of the Gram matrix for convection–diffusion equations Original Research Article
Author/Authors
Gh. Juncu، نويسنده , , C. Popa، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1998
Pages
9
From page
225
To page
233
Abstract
The paper analyses the numerical performance of preconditioning with Gram matrix approximations for the solution of a convection–diffusion equation. The convection–diffusion equation is discretized on a rectangular grid by standard finite element methods with piecewise linear test and trial functions. The discrete linear system is solved by two different conjugate gradient algorithms: CGS and GMRES. The preconditioning with Gram matrix approximations consists of replacing the solving of the equation with the preconditioner by a few iterations of an appropriate iterative scheme. Two iterative algorithms are tested: incomplete Cholesky and multigrid. Numerical experiments indicate that these preconditioners are efficient at relatively small values of the Reynolds number.
Keywords
Convection–diffusion equation , Preconditioning , Gram matrix , Incomplete Cholesky , Multigrid , Conjugate gradient
Journal title
Mathematics and Computers in Simulation
Serial Year
1998
Journal title
Mathematics and Computers in Simulation
Record number
853470
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