Spectral methods were proven invaluable in numerical simulation of PDEs (Partial Differential Equations), but the frequent global communication required raises a fundamental barrier to their use on highly parallel architectures. To explore this issue, a 3-D implicit spectral method was implemented on an Intel hypercube. Utilization of about 50 percent was achieved on a 32 node iPSC/860 hypercube, for a 64 x 64 x 64 Fourier-spectral grid; finer grids yield higher utilizations. Chebyshev-spectral grids are more problematic, since plane-relaxation based multigrid is required. However, by using a semicoarsening multigrid algorithm, and by relaxing all multigrid levels concurrently, relatively high utilizations were also achieved in this harder ...
The issue of solving the time-dependent incompressible Navier-Stokes equations on the Connection Mac...
The practical question of whether the classical spectral transform method, widely used in atmospheri...
The convergence rate of standard multigrid algorithms degenerates on problems with stretched grids o...
Here we have demonstrated the possibility of very high performance in the implementation of a global...
Spectral methods have proven invaluable in numerical simulation of PUN, but the frequent global comm...
Implicit finite difference schemes are often the preferred numerical schemes in computational fluid ...
Spectral element methods are high-order weighted residual techniques for partial differential equati...
Four totally parallel algorithms for the solution of a sparse linear system have common characterist...
Abstract. The spectral transform method is a standard numerical technique for solving par-tial diere...
Explicit codes are often used to simulate the nonlinear dynamics of large-scale structural systems, ...
This paper is solely devoted to spectral iterative methods including spectral multigrid methods. The...
ABSTRACT We solve a time dependent semilinear partial differential equation using a spectral colloca...
Spectral collocation methods have proven to be efficient discretization schemes for many aerodynamic...
As computer hardware has evolved, the time required to perform numerical simulations has reduced, al...
Stable and spectrally accurate numerical methods are constructed on arbitrary grids for partial diff...
The issue of solving the time-dependent incompressible Navier-Stokes equations on the Connection Mac...
The practical question of whether the classical spectral transform method, widely used in atmospheri...
The convergence rate of standard multigrid algorithms degenerates on problems with stretched grids o...
Here we have demonstrated the possibility of very high performance in the implementation of a global...
Spectral methods have proven invaluable in numerical simulation of PUN, but the frequent global comm...
Implicit finite difference schemes are often the preferred numerical schemes in computational fluid ...
Spectral element methods are high-order weighted residual techniques for partial differential equati...
Four totally parallel algorithms for the solution of a sparse linear system have common characterist...
Abstract. The spectral transform method is a standard numerical technique for solving par-tial diere...
Explicit codes are often used to simulate the nonlinear dynamics of large-scale structural systems, ...
This paper is solely devoted to spectral iterative methods including spectral multigrid methods. The...
ABSTRACT We solve a time dependent semilinear partial differential equation using a spectral colloca...
Spectral collocation methods have proven to be efficient discretization schemes for many aerodynamic...
As computer hardware has evolved, the time required to perform numerical simulations has reduced, al...
Stable and spectrally accurate numerical methods are constructed on arbitrary grids for partial diff...
The issue of solving the time-dependent incompressible Navier-Stokes equations on the Connection Mac...
The practical question of whether the classical spectral transform method, widely used in atmospheri...
The convergence rate of standard multigrid algorithms degenerates on problems with stretched grids o...