Incomplete factorization-based preconditionings for solving the Helmholtz equation

Discretization of boundary integral equations leads, in general, to fully populated complex valued non-Hermitian systems of equations. In this paper we consider the e cient solution of these boundary element systems by preconditioned iterative methods of Krylov subspace type. We devise preconditione

This paper demonstrates the use of shape-preserving exponential spline interpolation in a characteristic based numerical scheme for the solution of the linear advective -diffusion equation. The results from this scheme are compared with results from a number of numerical schemes in current use using

The order of the matrices involved in several algebraic problems decreases during the solution process. In these cases, parallel algorithms which use adaptive solving block sizes offer better performance results than the ones obtained on parallel algorithms using traditional constant block sizes. Re

The eigenvalue problem of the time-independent Schrodinger equation is solved as usual by expanding the eigenfunctions in terms of a basis set. However, the wave-function Ž . expansion coefficients WECs , which are certain matrix elements of the wave operator, are determined by an iterative method.