The minimal polynomial extrapolation (MPE) and reduced rank extrapolation (RRE) are two effective techniques that have been used in accelerating the convergence of vector sequences, such as those that are obtained from iterative solution of linear and nonlinear systems of equation. Their definitions involve some linear least squares problems, and this causes difficulties in their numerical implementation. Timewise efficient and numerically stable implementations for MPE and RRE are developed. A computer program written in FORTRAN 77 is also appended and applied to some model problems
We derive a new class of iterative schemes for accelerating the convergence of the EM algorithm, by ...
Reduction of total computing time required by an iterative algorithm for solving Navier-Stokes equat...
Richardson extrapolation (RE) is based on a very simple and elegant mathematical idea that has been ...
AbstractThe minimal polynomial extrapolation (MPE) and reduced rank extrapolation (RRE) are two very...
AbstractThe present paper is a survey of the most popular vector extrapolation methods such as the r...
The minimal polynomial and reduced rank extrapolation algorithms are two acceleration of convergence...
Extrapolation methods can be used to accelerate the convergence of vector sequences. It is shown ho...
AbstractIt is shown that the four vector extrapolation methods, minimal polynomial extrapolation, re...
AbstractAn important problem that arises in different areas of science and engineering is that of co...
In this thesis, we study polynomial extrapolation methods. We discuss the design and implementation ...
A general approach to the construction of convergence acceleration methods for vector sequence is pr...
In this paper, we present a new framework for the recent multidimensional extrapolation methods: Ten...
This paper presents a general framework for Shanks transformations of sequences of elements in a vec...
We exemplify the equivalence between the MPE acceleration method and the vector (v-) method when th...
Nous nous intéressons, dans cette thèse, à l'étude des méthodes d'extrapolation polynômiales et à l'...
We derive a new class of iterative schemes for accelerating the convergence of the EM algorithm, by ...
Reduction of total computing time required by an iterative algorithm for solving Navier-Stokes equat...
Richardson extrapolation (RE) is based on a very simple and elegant mathematical idea that has been ...
AbstractThe minimal polynomial extrapolation (MPE) and reduced rank extrapolation (RRE) are two very...
AbstractThe present paper is a survey of the most popular vector extrapolation methods such as the r...
The minimal polynomial and reduced rank extrapolation algorithms are two acceleration of convergence...
Extrapolation methods can be used to accelerate the convergence of vector sequences. It is shown ho...
AbstractIt is shown that the four vector extrapolation methods, minimal polynomial extrapolation, re...
AbstractAn important problem that arises in different areas of science and engineering is that of co...
In this thesis, we study polynomial extrapolation methods. We discuss the design and implementation ...
A general approach to the construction of convergence acceleration methods for vector sequence is pr...
In this paper, we present a new framework for the recent multidimensional extrapolation methods: Ten...
This paper presents a general framework for Shanks transformations of sequences of elements in a vec...
We exemplify the equivalence between the MPE acceleration method and the vector (v-) method when th...
Nous nous intéressons, dans cette thèse, à l'étude des méthodes d'extrapolation polynômiales et à l'...
We derive a new class of iterative schemes for accelerating the convergence of the EM algorithm, by ...
Reduction of total computing time required by an iterative algorithm for solving Navier-Stokes equat...
Richardson extrapolation (RE) is based on a very simple and elegant mathematical idea that has been ...