Add to ORKGIn this paper we propose a refinement of some successive overrelaxation methods based on the reverse Gauss–Seidel method for solving a system of linear equations Ax = b by the decomposition A = Tm − Em − Fm, where Tm is a banded matrix of bandwidth 2m + 1. We study the convergence of the methods and give software implementation of algorithms in Mathematica package with numerical examples. ACM Computing Classification System (1998): G.1.3.This paper is partly supported by project NI13 FMI–002 of Department for Scientific Research, Paisii Hilendarski University of Plovdiv
AbstractA new numerical algorithm for solving nearly penta-diagonal Toeplitz linear systems is prese...
In this work we give su±cient conditions for k-th approximations of the polynomial roots of f(x) whe...
We discuss fitting of a parametric curve in the plane in the least-squares sense when the independen...
In this paper we give an iterative method to compute the principal n-th root and the principal inver...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
We present a numerical method for solving nonlinear equation systems, namely Ezquerro-Hern\'{a}ndez ...
One of the unitary forms of the quantum mechanical time evolution operator is given by Cayley's appr...
AbstractIn this work, we point out that there are incorrect assertions in the article by Li-Ying Sun...
International audienceSince their introduction in constructive cryptographic applications, pairings ...
One of the unitary forms of the quantum mechanical time evolution operator is given by Cayley's appr...
Z. Kovarik proposed in 1970 a method for approximate orthogonalization of a finite set of linearly i...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
The paper presents an algorithm of adaptation by successive mesh regeneration and its application to...
AbstractA new numerical algorithm for solving nearly penta-diagonal Toeplitz linear systems is prese...
In this work we give su±cient conditions for k-th approximations of the polynomial roots of f(x) whe...
We discuss fitting of a parametric curve in the plane in the least-squares sense when the independen...
In this paper we give an iterative method to compute the principal n-th root and the principal inver...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
This paper deals with extended solutions of a system of nonlinear integro-differential equations. Th...
We present a numerical method for solving nonlinear equation systems, namely Ezquerro-Hern\'{a}ndez ...
One of the unitary forms of the quantum mechanical time evolution operator is given by Cayley's appr...
AbstractIn this work, we point out that there are incorrect assertions in the article by Li-Ying Sun...
International audienceSince their introduction in constructive cryptographic applications, pairings ...
One of the unitary forms of the quantum mechanical time evolution operator is given by Cayley's appr...
Z. Kovarik proposed in 1970 a method for approximate orthogonalization of a finite set of linearly i...
AbstractThe numerical-analytic method is applied to a class of nonlinear differential-algebraic syst...
The paper presents an algorithm of adaptation by successive mesh regeneration and its application to...
AbstractA new numerical algorithm for solving nearly penta-diagonal Toeplitz linear systems is prese...
In this work we give su±cient conditions for k-th approximations of the polynomial roots of f(x) whe...
We discuss fitting of a parametric curve in the plane in the least-squares sense when the independen...