AbstractThe aim of this paper is to study multidimensional continued fraction algorithm over the field of formal power series. In the case of the Brun algorithm by using its homogenous version, we prove that it converges
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
AbstractWe give an O(log n) algorithm to compute the nth convergent of a periodic continued fraction...
AbstractIn this paper we consider the multidimensional g-fraction which is generalization of the con...
AbstractThe aim of this paper is to study multidimensional continued fraction algorithm over the fie...
We show that for the two-dimensional multiplicative Brun’s algorithm, the exponent of convergence is...
SIGLEAvailable from British Library Document Supply Centre-DSC:4335.26206(2000-12) / BLDSC - British...
Abstract. We introduce a multidimensional continued fraction algo-rithm based on Arnoux-Rauzy and Po...
AbstractFour algorithms for the computation of convergents of generalized continued fractions are de...
AbstractWe present an algorithm to produce the continued fraction expansion of a linear fractional t...
In the field of formal power series over a finite field, we prove a result which enables us to const...
Version 1: 22 pages, 12 figures. Version 2: 25 pages, 15 figures. The section on Cassaigne algorithm...
The first part of the thesis acquaints us with the Reed-Solomon codes, methods of their construction...
We introduce a simple geometrical two-dimensional continued fraction algorithm inspired from dynamic...
We analyse a continued fraction algorithm (abbreviated CFA) for arbitrary dimension n showing that i...
AbstractA new continued fraction algorithm is given and analyzed. It yields approximations for an ir...
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
AbstractWe give an O(log n) algorithm to compute the nth convergent of a periodic continued fraction...
AbstractIn this paper we consider the multidimensional g-fraction which is generalization of the con...
AbstractThe aim of this paper is to study multidimensional continued fraction algorithm over the fie...
We show that for the two-dimensional multiplicative Brun’s algorithm, the exponent of convergence is...
SIGLEAvailable from British Library Document Supply Centre-DSC:4335.26206(2000-12) / BLDSC - British...
Abstract. We introduce a multidimensional continued fraction algo-rithm based on Arnoux-Rauzy and Po...
AbstractFour algorithms for the computation of convergents of generalized continued fractions are de...
AbstractWe present an algorithm to produce the continued fraction expansion of a linear fractional t...
In the field of formal power series over a finite field, we prove a result which enables us to const...
Version 1: 22 pages, 12 figures. Version 2: 25 pages, 15 figures. The section on Cassaigne algorithm...
The first part of the thesis acquaints us with the Reed-Solomon codes, methods of their construction...
We introduce a simple geometrical two-dimensional continued fraction algorithm inspired from dynamic...
We analyse a continued fraction algorithm (abbreviated CFA) for arbitrary dimension n showing that i...
AbstractA new continued fraction algorithm is given and analyzed. It yields approximations for an ir...
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
AbstractWe give an O(log n) algorithm to compute the nth convergent of a periodic continued fraction...
AbstractIn this paper we consider the multidimensional g-fraction which is generalization of the con...
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