## multigrid methods: theory, applications, and supercomputing |

### What people are saying - Write a review

We haven't found any reviews in the usual places.

### Contents

Preface | 1 |

Fast PseudoInverse Algorithms on Hypercubes | 23 |

Thunder Bay Ontario Canada | 35 |

Copyright | |

32 other sections not shown

### Other editions - View all

### Common terms and phrases

airfoil analysis applied approximate pseudo-inverse blocks boundary conditions boundary value bounds Brandt C-level calculations cell coarse grid coarse grid correction coarser levels coarsest coefficients Comp components computational convergence factor convergence rate defined denotes difference differencing discretization domain efficiency eigenvalues elliptic error Euler equations fermion Figure fine-grid finest grid flow Fourier function Gauss-Seidel global grid points Helmholtz equation hypercube implementation initial guess Intel iPSC interpolation iteration Jacobi lattice linear Mach number Math matrix mesh Monte-Carlo multigrid algorithm multigrid convergence multigrid cycle Multigrid Methods multigrid solvers multilevel Navier-Stokes equations neighbors nodes nonlinear number of grids obtained operator optimal parallel parallel computers parameters partial differential equations performed Poisson equation preconditioner procedure processors pseudo-inverse rate of convergence relaxation scheme relaxation sweeps residual shock SIAM simulation singular smoothing rate solution solve step Table techniques Theorem tion transonic Trottenberg two-grid V-cycle variables vector velocity