AbstractThe aim of this article is to give some continued fractions expansions of the geometric matrix mean in order to make its computation practical and efficient. At the end, this work will be completed by illustrating our theoretical results with some numerical examples which explain the rapidity of the convergence of the obtained continued fractions expansions
A new continued fraction expansion algorithm, the so-called -expansion, is introduced and some of it...
Let K[λ] denote the polynomial ring over the number field K.Suppose thatf(λ)and g(λ)are coprime in K...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
AbstractThe aim of this work is to give some criteria on the convergence of matrix continued fractio...
AbstractWe discuss the properties of matrix-valued continued fractions based on Samelson inverse. We...
In this paper we recall some results and some criteria on the convergence of matrix continued fracti...
The aim of this paper is to provide some results and applications for continued fractions with matri...
AbstractA matrix continued fraction is defined and used for the approximation of a function F known ...
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
The purpose of this paper is to study convergence of certain continued fractions
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
We study two matrices N and M defined by the parameters of equivalent S- and J-continued fraction ex...
Abstract. The geometric mean of two matrices is considered and analyzed from a computational viewpoi...
We investigate the stability of the matrix arithmetic-geometric mean (AGM) iteration. We show that ...
A new continued fraction expansion algorithm, the so-called -expansion, is introduced and some of it...
Let K[λ] denote the polynomial ring over the number field K.Suppose thatf(λ)and g(λ)are coprime in K...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
AbstractThe aim of this work is to give some criteria on the convergence of matrix continued fractio...
AbstractWe discuss the properties of matrix-valued continued fractions based on Samelson inverse. We...
In this paper we recall some results and some criteria on the convergence of matrix continued fracti...
The aim of this paper is to provide some results and applications for continued fractions with matri...
AbstractA matrix continued fraction is defined and used for the approximation of a function F known ...
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
The purpose of this paper is to study convergence of certain continued fractions
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
We study two matrices N and M defined by the parameters of equivalent S- and J-continued fraction ex...
Abstract. The geometric mean of two matrices is considered and analyzed from a computational viewpoi...
We investigate the stability of the matrix arithmetic-geometric mean (AGM) iteration. We show that ...
A new continued fraction expansion algorithm, the so-called -expansion, is introduced and some of it...
Let K[λ] denote the polynomial ring over the number field K.Suppose thatf(λ)and g(λ)are coprime in K...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...