论文信息 - Adaptive modified alternating triangular iterative method for solving grid equations with a non-self-adjoint operator

Adaptive modified alternating triangular iterative method for solving grid equations with a non-self-adjoint operator

Adaptive methods for solving convection-diffusion problems are developed. A variant of the adaptive modified alternating triangular method of minimal corrections is constructed and its convergence rate is estimated given that the grid Peclet number is bounded, which holds for monotone difference approximations of diffusion-convection problems. Results of the numerical calculation of spatial three-dimensional currents in the Sea of Azov are given; a parallel implementation of this method performed on a supercomputer at the Taganrog Institute of Technology is considered.

A. I. Sukhinov | A. E. Chistyakov

[1] A. Konovalov. To the Theory of the Alternating Triangle Iteration Method , 2002 .

[2] Petr N. Vabishchevich,et al. Numerical Methods for Solving Convection-Diffusion Problems , 2012, ArXiv.

[3] E. Alekseenko,et al. Numerical realization of the three-dimensional model of hydrodynamics for shallow water basins on a high-performance system , 2011 .

[4] A. A. Samarskii,et al. Numerical Methods for Grid Equations , 2018 .

[5] O. Milyukova. Parallel iterative methods using factorized preconditioning matrices for solving elliptic equations on triangular grids , 2006 .

[6] A. Samarskii. The Theory of Difference Schemes , 2001 .