Abstract: In Introduction we discuss the history of the continued fraction and of its generalisations. In §1 we compare the geometric interpretations of the continued fraction given by Klein, by Voronoi and by author, and define the convex continued fraction. In §2 we propose an algorithm of computation of the convex continued fraction. In §S3 we compare the geometric interpretations of the multidimensional generalisations of the continued fraction given by Klein, by Voronoi and by author (see preprint no. 86/2003). In §4 we propose an algorithm of computation of a generalisation of the covex continued fraction. In §5 we compare points of Klein, of Voronoi and of the author in two-dimensional and three-dimensional cases.Note: ...
Continued Fraction is origin back about two thousand years ago, but it was officially named in 1695,...
Abstract: A new theory of generalized continued fractions connected with the Gauss transfo...
Le problème de l'étude des plus simples fractions continues n-dimensional en sens de Klein pour ngre...
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
Abstract: In a three-dimensional space we consider three gomogeneous linear forms. In anot...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
Abstract: Earlier we computed the Klein’s polyhedral for two cubic forms of Davenport g₁ a...
The study of arithmetical continued fractions has been restricted, for the most part, to the investi...
We examine Van Vleck's Theorem on continued fractions using Möbius transformations and hyperbolic ge...
AbstractIn this paper the generalization of a continued fraction in the sense of the Jacobi-Perron a...
This is an exposition of the analytic theory of continued fractions in the complex domain with empha...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
In this paper, we will first summarize known results concerning contin-ued fractions. Then we will l...
Continued Fraction is origin back about two thousand years ago, but it was officially named in 1695,...
Abstract: A new theory of generalized continued fractions connected with the Gauss transfo...
Le problème de l'étude des plus simples fractions continues n-dimensional en sens de Klein pour ngre...
Abstract: In Introduction we discuss the history of the continued fraction and of its gene...
Abstract: In a three-dimensional space we consider three gomogeneous linear forms. In anot...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
Abstract: Earlier we computed the Klein’s polyhedral for two cubic forms of Davenport g₁ a...
The study of arithmetical continued fractions has been restricted, for the most part, to the investi...
We examine Van Vleck's Theorem on continued fractions using Möbius transformations and hyperbolic ge...
AbstractIn this paper the generalization of a continued fraction in the sense of the Jacobi-Perron a...
This is an exposition of the analytic theory of continued fractions in the complex domain with empha...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
In this paper, we will first summarize known results concerning contin-ued fractions. Then we will l...
Continued Fraction is origin back about two thousand years ago, but it was officially named in 1695,...
Abstract: A new theory of generalized continued fractions connected with the Gauss transfo...
Le problème de l'étude des plus simples fractions continues n-dimensional en sens de Klein pour ngre...