A Domain Decomposition Preconditioner for Hermite Collocation Problems

Domain Decomposition Preconditioners for Hermite Collocation Problems

An Additive Schwarz Algorithm for Piecewise Hermite Bicubic

An overlapping domain decomposition, additive Schwarz, conjugate gradient method is presented for the solution of the linear systems which arise when orthogonal spline collocation with piecewise Hermite bicu-bics is applied to the Dirichlet problem for Poisson's equation on a rectangle .

A Preconditioned Conjugate Gradient Method for Nonselfadjoint or Indefinite Orthogonal Spline Collocation Problems

We study the computation of the orthogonal spline collocation solution of a linear Dirichlet boundary value problem with a nonselfadjoint or an indefinite operator of the form Lu = ∑ aij(x)uxixj + ∑ bi(x)uxi + c(x)u. We apply a preconditioned conjugate gradient method to the normal system of collocation equations with a preconditioner associated with a separable operator, and prove that the res...

Parallel implementation of the Bi-CGSTAB method with block red-black Gauss-Seidel preconditioner applied to the Hermite collocation discretization of partial differential equations

We describe herein the parallel implementation of the Bi-CGSTAB method with a block Red-Black Gauss-Seidel (RBGS) preconditioner applied to the systems of linear algebraic equations that arise from the Hermite collocation discretization of partial di erential equations in two spatial dimensions. The method is implemented on the Cray T3E, a parallel processing supercomputer. Speedup results are ...

A Nonoverlapping Domain Decomposition Preconditioner for a Symmetric Interior Penalty Method

In this talk we will discuss a nonoverlapping domain decomposition pre-conditioner for the symmetric interior penalty Galerkin method [1, 2, 3]. Thepreconditioner is based on balancing domain decomposition by constraints [4].Theoretical results on the condition number estimate of the preconditioned sys-tem will be presented along with numerical results. References[1] J. ...