| Introduction |
| 1 | The cascadic algorithm for 2D problems |
| 1.1 | The weakly nonlinear elliptic equation |
| 1.1.1 | Formulation of the differential problem |
| 1.1.2 | Formulation of the discrete problem |
| 1.1.3 | Formulation of the cascadic algorithm |
| 1.1.4 | Auxiliary estimates |
| 1.1.5 | Convergence of the cascadic algorithm |
| 1.2 | The indefinite-sign elliptic problem |
| 1.2.1 | Formulation of the differential problem |
| 1.2.2 | Formulation of the discrete problem |
| 1.2.3 | Formulation of the cascadic algorithm |
| 1.2.4 | An auxiliary operator |
| 1.2.5 | Convergence of the cascadic algorithm |
| 1.2.6 | Optimization of the number of iterations |
| 1.3 | The plane elasticity problem |
| 1.3.1 | Formulation of the differential problem |
| 1.3.2 | Formulation of the discrete problem |
| 1.3.3 | Formulation of the cascadic algorithm |
| 1.3.4 | Convergence of the cascadic algorithm and optimization of the number of iterations |
| 2 | The cascadic algorithm for the 3D Dirichlet problem |
| 2.1 | The 3D Dirichlet problem on a polyhedron |
| 2.1.1 | Formulation of the differential problem |
| 2.1.2 | Formulation of the discrete problem |
| 2.1.3 | Formulation of the cascadic algorithm |
| 2.1.4 | Convergence of the cascadic algorithm |
| 2.1.5 | Optimization of the number of iterations |
| 2.2 | Asymptotic stability of the algorithm of triangulation refine ment for a 3D domain |
| 2.2.1 | The algorithm of dividing |
| 2.2.2 | Criteria of quality of a triangulation |
| 2.2.3 | Estimation of quality of the triangulation |
| 2.3 | The cascadic algorithm for a domain with a smooth curvilin ear boundary |
| 2.3.1 | Formulation of the differential problem |
| 2.3.2 | Formulation of the discrete problem |
| 2.3.3 | An auxiliary result |
| 2.3.4 | Convergence of the Galerkin solution |
| 2.3.5 | The estimate of the eigenvalues of the matrix of the discrete problem |
| 2.3.6 | Convergence of the cascadic algorithm |
| 3 | Numerical results |
| 3.1 | Dependence of the convergence rate of the V-cycle upon smoothing |
| 3.1.1 | Preliminary remarks |
| 3.1.2 | Formulation of the multigrid algorithm |
| 3.1.3 | Numerical tests |
| 3.2 | Cascadic algorithm for the Poisson equation |
| 3.2.1 | Two-step semi-iterative process |
| 3.2.2 | Dependence of the convergence on the number of iteration steps |
| References |
| Introduction |
| 1 | The formulation of the problem and the splitting into physical processes |
| 2 | Discretization of the fractional step of pressure work |
| 2.1 | Integration over Ω |
| 2.2 | Integration with the help of small fictitious domains for uniformity of equations |
| 3 | Discretization of the fractional step of convection-diffusion |
| 3.1 | Futher splitting and discretization of the equation for the first component of velocity |
| 3.2 | Splitting and discretization of the equation for the second component of velocity |
| 3.3 | Integration with the help of small fictitious domains for uniformity of equations |
| 4 | Numerical experiments |
| 5 | Conclusions |
| 5.1 | Splitting method vs. solution with complete operator |
| 5.2 | Staggerred meshes vs. united mesh |
| 5.3 | Square vs. triangle mesh |
| References |