Add to ORKGAbstract: In Introduction we discuss the history of the continued fraction and of its generalizations. 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 §3 we compare the geometric interpretations of the multidimensional generalizations of the continued fraction given by Klein, by Voronoi and by author (see preprint no. 86/2003). In §4 we improve an algorithm of computation of a generalization of the covex continued fraction given by the author (preprint no. 10/2004). In §5 we improve an algorithm for ordering three points on a plane.Note:...
AbstractIn this note we introduce a new algorithm to compute the continued fraction of a real number...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
AbstractA new continued fraction algorithm is given and analyzed. It yields approximations for an ir...
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...
AbstractIn this paper the generalization of a continued fraction in the sense of the Jacobi-Perron a...
Abstract: Earlier we computed the Klein’s polyhedral for two cubic forms of Davenport g₁ a...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
AbstractA new algorithm is described in the paper for calculating continued fractions. The condition...
Abstract: In the preprint 'The correct generalization of the continued fraction' by A.D.Br...
AbstractFour algorithms for the computation of convergents of generalized continued fractions are de...
AbstractIn this note we introduce a new algorithm to compute the continued fraction of a real number...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
AbstractA new continued fraction algorithm is given and analyzed. It yields approximations for an ir...
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...
AbstractIn this paper the generalization of a continued fraction in the sense of the Jacobi-Perron a...
Abstract: Earlier we computed the Klein’s polyhedral for two cubic forms of Davenport g₁ a...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
Title: Computational problems of elementary number theory Author: Mgr. Jiří Widž Department: Departm...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
In this thesis we will deal with continued fractions, an expression which allow us to represent diff...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
AbstractA new algorithm is described in the paper for calculating continued fractions. The condition...
Abstract: In the preprint 'The correct generalization of the continued fraction' by A.D.Br...
AbstractFour algorithms for the computation of convergents of generalized continued fractions are de...
AbstractIn this note we introduce a new algorithm to compute the continued fraction of a real number...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
AbstractA new continued fraction algorithm is given and analyzed. It yields approximations for an ir...