This thesis presents the development of a parallel algorithm to solve symmetric systems of linear equations and the computational implementation of a parallel partial differential equations solver for unstructured meshes. The proposed method, called distributive conjugate gradient - DCG, is based on a single-level domain decomposition method and the conjugate gradient method to obtain a highly scalable parallel algorithm. An overview on methods for the discretization of domains and partial differential equations is given. The partition and refinement of meshes is discussed and the formulation of the weighted residual method for two- and three-dimensions presented. Some of the methods to solve systems of linear equations are introduced, high...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
This paper is concerned with the solution of a linear system of equations which have the form of AX ...
Solving Partial Differential Equations (PDEs) is an important problem in many fields of science and ...
This thesis presents the development of a parallel algorithm to solve symmetric systems of linear e...
AbstractThe report presents some results in solving finite element equations via a parallel version ...
MasterThe purpose of this text is to offer an overview of the most popular domain decomposition meth...
This paper examines the potential of parallel computation methods for pamal differential equations (...
This paper describes the use of a parallel computer system in applying a finite difference method to...
AbstractLinear systems of the form Ax = b, where the matrix A is symmetric and positive definite, of...
dissertationPartial differential equations (PDEs) are widely used in science and engineering to mode...
The rapid improvement ' in computational power available due to faster chips and parallel processing...
For the solution of discretized ordinary or partial differential equations it is necessary to solve ...
We present an implementation of a finite-difference approximation for the solution of partial differ...
In these notes we will present an overview of a number of related iterative methods for the solution...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
This paper is concerned with the solution of a linear system of equations which have the form of AX ...
Solving Partial Differential Equations (PDEs) is an important problem in many fields of science and ...
This thesis presents the development of a parallel algorithm to solve symmetric systems of linear e...
AbstractThe report presents some results in solving finite element equations via a parallel version ...
MasterThe purpose of this text is to offer an overview of the most popular domain decomposition meth...
This paper examines the potential of parallel computation methods for pamal differential equations (...
This paper describes the use of a parallel computer system in applying a finite difference method to...
AbstractLinear systems of the form Ax = b, where the matrix A is symmetric and positive definite, of...
dissertationPartial differential equations (PDEs) are widely used in science and engineering to mode...
The rapid improvement ' in computational power available due to faster chips and parallel processing...
For the solution of discretized ordinary or partial differential equations it is necessary to solve ...
We present an implementation of a finite-difference approximation for the solution of partial differ...
In these notes we will present an overview of a number of related iterative methods for the solution...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
The block preconditioned conjugate gradient (BPCG) methods, even if very effective for solving the l...
This paper is concerned with the solution of a linear system of equations which have the form of AX ...
Solving Partial Differential Equations (PDEs) is an important problem in many fields of science and ...