Add to ORKGWe study the strong convergence of certain multidimensional continued fraction algorithms. In particular, in the two-dimensional case, we prove that the second Lyapunov exponent of Selmer's algorithm is negative and bound it away from zero. Moreover, we give heuristic results on several other continued fraction algorithms. Our results indicate that all classical multidimensional continued fraction algorithms cease to be strongly convergent for high dimensions. The only exception seems to be the Arnoux-Rauzy algorithm which, however, is defined only on a set of measure zero
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
It is known that if a ∈ ℂ \(−∞,−¼) and an → a as n → ∞, then the infinite continued fraction with co...
The study of combinatorial properties of mathematical objects is a very important research field and...
We show that for the two-dimensional multiplicative Brun’s algorithm, the exponent of convergence is...
We introduce a simple geometrical two-dimensional continued fraction algorithm inspired from dynamic...
SIGLEAvailable from British Library Document Supply Centre-DSC:4335.26206(2000-12) / BLDSC - British...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
AbstractThe aim of this paper is to study multidimensional continued fraction algorithm over the fie...
We analyse a continued fraction algorithm (abbreviated CFA) for arbitrary dimension n showing that i...
Abstract: This paper studies the rate of convergence of purely periodic continued fractions, and giv...
AbstractIn the study of simultaneous rational approximation of functions using rational functions wi...
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
It is known that if a ∈ ℂ \(−∞,−¼) and an → a as n → ∞, then the infinite continued fraction with co...
The study of combinatorial properties of mathematical objects is a very important research field and...
We show that for the two-dimensional multiplicative Brun’s algorithm, the exponent of convergence is...
We introduce a simple geometrical two-dimensional continued fraction algorithm inspired from dynamic...
SIGLEAvailable from British Library Document Supply Centre-DSC:4335.26206(2000-12) / BLDSC - British...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
Is there a good continued fraction approximation between every two bad ones? What is the entropy of ...
There are infinite processes (matrix products, continued fractions, (r, s)-matrix continued fraction...
AbstractThe aim of this paper is to study multidimensional continued fraction algorithm over the fie...
We analyse a continued fraction algorithm (abbreviated CFA) for arbitrary dimension n showing that i...
Abstract: This paper studies the rate of convergence of purely periodic continued fractions, and giv...
AbstractIn the study of simultaneous rational approximation of functions using rational functions wi...
AbstractThis paper discusses an algorithm for generating a new type of continued fraction, a δ-fract...
It is known that if a ∈ ℂ \(−∞,−¼) and an → a as n → ∞, then the infinite continued fraction with co...
The study of combinatorial properties of mathematical objects is a very important research field and...