Add to ORKGA new continued fraction expansion algorithm, the so-called -expansion, is introduced and some of its basic properties, such as convergence of the algorithm and ergodicity of the underlying dynamical system, have been obtained. Although seemingly a minor variation of the regular continued fraction (RCF) expansion and its many variants (such as Nakada's -expansions, Schweiger's odd- and even-continued fraction expansions, and the Rosen fractions), these -expansions behave very differently from the RCF and many important question remains open, such as the exact form of the invariant measure, and the "shape" of the natural extension
Rational approximations to real numbers have been used from ancient times, either for convenience in...
The continued fraction expansion of a real number may be studied by considering a suitable discrete...
We compare two families of continued fractions algorithms, the symmetrized Rosen algorithm and the V...
AbstractIn this note we introduce a new algorithm to compute the continued fraction of a real number...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
A 2-continued fraction expansion is a generalisation of the regular continued fraction expansion, wh...
A new family of continued fractions expansions is introduced by combining two existing family's (2-e...
In chapter 1 we will give a brief intorduction to continued fractions, and scetch the prove of why q...
Abstract. For a real number 0 < λ < 2, we introduce a transformation Tλ naturally associated t...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
The continued fraction expansion of a real number may be studied by considering a suitable discrete...
We compare two families of continued fractions algorithms, the symmetrized Rosen algorithm and the V...
AbstractIn this note we introduce a new algorithm to compute the continued fraction of a real number...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
Abstract: We propose a new twodimensional generalization of the algorithm for expansion of...
A 2-continued fraction expansion is a generalisation of the regular continued fraction expansion, wh...
A new family of continued fractions expansions is introduced by combining two existing family's (2-e...
In chapter 1 we will give a brief intorduction to continued fractions, and scetch the prove of why q...
Abstract. For a real number 0 < λ < 2, we introduce a transformation Tλ naturally associated t...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
Rational approximations to real numbers have been used from ancient times, either for convenience in...
The continued fraction expansion of a real number may be studied by considering a suitable discrete...
We compare two families of continued fractions algorithms, the symmetrized Rosen algorithm and the V...