Add to ORKGIn this paper we consider a class of continued fraction expansions: the so-called $N$-expansions with a finite digit set, where $N\geq 2$ is an integer. These \emph{$N$-expansions with a finite digit set} were introduced in [KL,L], and further studied in [dJKN,S]. For $N$ fixed they are steered by a parameter $\alpha\in (0,\sqrt{N}-1]$. In [KL], for $N=2$ an explicit interval $[A,B]$ was determined, such that for all $\alpha\in [A,B]$ the entropy $h(T_{\alpha})$ of the underlying Gauss-map $T_{\alpha}$ is equal. In this paper we show that for all $N\in \mathbb N$, $N\geq 2$, such plateaux exist. In order to show that the entropy is constant on such plateaux, we obtain the underlying planar natural extension of the maps $T_{\alpha}$, the $T_...
We study a one-parameter family of interval maps $\{T_\alpha\}_{\alpha\in[1,\beta]}$, with $\beta$ t...
The main aim of this paper is to develop extreme value theory for $\theta$-expansions. We get the li...
AbstractGalambos has conjectured that the logarithm of the geometric mean of partial denominators in...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
Let beta be a real number bigger than 1 and A a finite set of arbitrary real numbers. A beta-expansi...
For N∈ N≥ 2 and α∈ R such that 0<α≤N-1, we define Iα: = [α, α+ 1] and Iα-:=[α,α+1) and investigat...
AbstractFor certain random variables X1,X2,… which can be expressed by means of the natural extensio...
Expansions that furnish increasingly good approximations to real numbers are usually related to dyna...
"Natural extension of arithmetic algorithms and S-adic system". July 20~24, 2015. edited by Shigeki ...
We study the dynamics of a family Kαof discontinuous interval maps whose (infinitely many) branches ...
International audienceFor a real number $01$. Some properties of the map $\lambda\mapsto\beta(\lambd...
We generalize the greedy and lazy -transformations for a real base to the setting of alternate bases...
For a given irrational x, the Gauss map, T( x) = 〈1/x〉, provides an infinite sequence of rational ap...
We study the dynamics of a family Kα of discontinuous interval maps whose (infinitely many) branches...
Given a positive integer $N$ and $x$ irrational between zero and one, an $N$-continued fraction expa...
We study a one-parameter family of interval maps $\{T_\alpha\}_{\alpha\in[1,\beta]}$, with $\beta$ t...
The main aim of this paper is to develop extreme value theory for $\theta$-expansions. We get the li...
AbstractGalambos has conjectured that the logarithm of the geometric mean of partial denominators in...
In this paper we consider continued fraction (CF) expansions on intervals different from [0,1]. For ...
Let beta be a real number bigger than 1 and A a finite set of arbitrary real numbers. A beta-expansi...
For N∈ N≥ 2 and α∈ R such that 0<α≤N-1, we define Iα: = [α, α+ 1] and Iα-:=[α,α+1) and investigat...
AbstractFor certain random variables X1,X2,… which can be expressed by means of the natural extensio...
Expansions that furnish increasingly good approximations to real numbers are usually related to dyna...
"Natural extension of arithmetic algorithms and S-adic system". July 20~24, 2015. edited by Shigeki ...
We study the dynamics of a family Kαof discontinuous interval maps whose (infinitely many) branches ...
International audienceFor a real number $01$. Some properties of the map $\lambda\mapsto\beta(\lambd...
We generalize the greedy and lazy -transformations for a real base to the setting of alternate bases...
For a given irrational x, the Gauss map, T( x) = 〈1/x〉, provides an infinite sequence of rational ap...
We study the dynamics of a family Kα of discontinuous interval maps whose (infinitely many) branches...
Given a positive integer $N$ and $x$ irrational between zero and one, an $N$-continued fraction expa...
We study a one-parameter family of interval maps $\{T_\alpha\}_{\alpha\in[1,\beta]}$, with $\beta$ t...
The main aim of this paper is to develop extreme value theory for $\theta$-expansions. We get the li...
AbstractGalambos has conjectured that the logarithm of the geometric mean of partial denominators in...