AbstractWe present a new set of codes for solving almost block diagonal systems of linear equations and for performing multiplicative operations with matrices represented using the same data structures. These data structures arise when solving ordinary differential equation boundary value problems with non-separated boundary conditions by finite differences, and when using spline collocation methods. Our codes are written in a modular form using the BLAS and are intended to take advantage of vector architecture and, to a limited extent, parallelism
Every student of numerical linear algebra is familiar with block matrices and vectors. The same idea...
This research study aimed at developing block solver for multidimensional systems (BSMS) of ordinary...
A parallel variant of the block Gauss-Seidel iteration for the solution of block-banded linear syste...
Almost block diagonal (ABD) linear systems arise in a variety of contexts, specifically in numerical...
In this paper we analyze the solution of Borderd Almost Block Diagonal (BABD) linear systems arising...
We consider linear systems with coefficient matrices having the ABD or the Bordered ABD (BABD) struc...
We introduce a family of multivalue almost collocation methods with diagonal coefficient matrix for ...
Almost block diagonal (ABD) linear systems arise in a variety of contexts, specifically in numerical...
Abstract. We consider linear systems with coefficient matrices of Bordered ABD structure. They arise...
Many numerical algorithms for the solution of Boundary Value Problems (BVPs) for Ordinary Differenti...
We generalize the cyclic reduction algorithm to the solution of Bordered ABD linear systems with blo...
In this thesis, we mainly concentrate on the implementation of sequential and parallel algorithms fo...
SIGLEAvailable from British Library Document Supply Centre- DSC:8724.9(UNUT-CL-TRS--350) / BLDSC - B...
AbstractA new tearing-type approach toward the solution of Almost Block Diagonal Systems on distribu...
Symmetric collocation methods with RBFs allow approximation of the solution of a partial differentia...
Every student of numerical linear algebra is familiar with block matrices and vectors. The same idea...
This research study aimed at developing block solver for multidimensional systems (BSMS) of ordinary...
A parallel variant of the block Gauss-Seidel iteration for the solution of block-banded linear syste...
Almost block diagonal (ABD) linear systems arise in a variety of contexts, specifically in numerical...
In this paper we analyze the solution of Borderd Almost Block Diagonal (BABD) linear systems arising...
We consider linear systems with coefficient matrices having the ABD or the Bordered ABD (BABD) struc...
We introduce a family of multivalue almost collocation methods with diagonal coefficient matrix for ...
Almost block diagonal (ABD) linear systems arise in a variety of contexts, specifically in numerical...
Abstract. We consider linear systems with coefficient matrices of Bordered ABD structure. They arise...
Many numerical algorithms for the solution of Boundary Value Problems (BVPs) for Ordinary Differenti...
We generalize the cyclic reduction algorithm to the solution of Bordered ABD linear systems with blo...
In this thesis, we mainly concentrate on the implementation of sequential and parallel algorithms fo...
SIGLEAvailable from British Library Document Supply Centre- DSC:8724.9(UNUT-CL-TRS--350) / BLDSC - B...
AbstractA new tearing-type approach toward the solution of Almost Block Diagonal Systems on distribu...
Symmetric collocation methods with RBFs allow approximation of the solution of a partial differentia...
Every student of numerical linear algebra is familiar with block matrices and vectors. The same idea...
This research study aimed at developing block solver for multidimensional systems (BSMS) of ordinary...
A parallel variant of the block Gauss-Seidel iteration for the solution of block-banded linear syste...