Add to ORKGAbstract. In this note the distribution of the approximation coe cients n, associated with the regular continued fraction expansion of numbers x 2 [0 � 1), is given under extra conditions on the numerators and denominators of the convergents pn=qn. Similar results are also obtained for S-expansions. Further, a Gauss-Kusmin type theorem is derived for the regular continued fraction expansion under these extra conditions
In an earlier paper we introduced the notion of" Approximation of Function by Continued Fractions" (...
In this paper we have established interesting results involving continued fraction. Special cases of...
In this thesis continued fractions are studied in three directions: semi-regular continued fractions...
. In this note the distribution of the approximation coefficients \Theta n , associated with the reg...
One of the first and still one of the most important results in the metrical theory of continued f...
The study of arithmetical continued fractions has been restricted, for the most part, to the investi...
Theoretical results are derived for constructing continued fractions which correspond, in some presc...
AbstractThe continued fraction convergents to a random real number are shown to approximate that num...
A new family of continued fractions expansions is introduced by combining two existing family's (2-e...
The purpose of this paper is to study convergence of certain continued fractions
AbstractLet (Pn/Qn)n ≥ 0 be the sequence of regular continued fraction convergents of the real irrat...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
AbstractA continued fraction expansion in two variables is described and shown to correspond to a do...
AbstractWe improve a result of D. Knuth about the convergence of approximations of a continued fract...
In an earlier paper we introduced the notion of" Approximation of Function by Continued Fractions" (...
In an earlier paper we introduced the notion of" Approximation of Function by Continued Fractions" (...
In this paper we have established interesting results involving continued fraction. Special cases of...
In this thesis continued fractions are studied in three directions: semi-regular continued fractions...
. In this note the distribution of the approximation coefficients \Theta n , associated with the reg...
One of the first and still one of the most important results in the metrical theory of continued f...
The study of arithmetical continued fractions has been restricted, for the most part, to the investi...
Theoretical results are derived for constructing continued fractions which correspond, in some presc...
AbstractThe continued fraction convergents to a random real number are shown to approximate that num...
A new family of continued fractions expansions is introduced by combining two existing family's (2-e...
The purpose of this paper is to study convergence of certain continued fractions
AbstractLet (Pn/Qn)n ≥ 0 be the sequence of regular continued fraction convergents of the real irrat...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
AbstractA continued fraction expansion in two variables is described and shown to correspond to a do...
AbstractWe improve a result of D. Knuth about the convergence of approximations of a continued fract...
In an earlier paper we introduced the notion of" Approximation of Function by Continued Fractions" (...
In an earlier paper we introduced the notion of" Approximation of Function by Continued Fractions" (...
In this paper we have established interesting results involving continued fraction. Special cases of...
In this thesis continued fractions are studied in three directions: semi-regular continued fractions...