AbstractIn this note we consider the Lüroth expansion of a real number, and we study the Hausdorff dimension of a class of sets defined in terms of the frequencies of digits in the expansion. We also study the speed at which the approximants obtained from the Lüroth expansion converge. In addition, we describe the multifractal properties of the level sets of the Lyapunov exponent, which measures the exponential speed of approximation obtained from the approximants. Finally, we describe the relation of the Lüroth expansion with the continued fraction expansion and the β-expansion. We remark that our work is still another application of the theory of dynamical systems to number theory
AbstractIn this paper the sum-level sets for Lüroth expansion are introduced. We prove that the Lebe...
We investigate some Diophantine approximation constants related to the simultaneous approximation of...
AbstractIn this paper we apply the techniques and results from the theory of multifractal divergence...
Abstract. In this note we consider the Lüroth expansion of a real number, and we study the Hausdorf...
AbstractIn this note we consider the Lüroth expansion of a real number, and we study the Hausdorff d...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
summary:It is well known that every $x\in (0,1]$ can be expanded to an infinite Lüroth series in the...
We describe how the multifractal analysis of dynamical systems can be used to compute the Hausdorff ...
Let $\{x_n\}_{n\geq 0}$ be a sequence of $[0,1]^d$, $\{\lambda_n\} _{n\geq 0}$ a sequence of positiv...
We study the sets DF(β) of digit frequencies of β-expansions of numbers in [0,1]. We show that DF(β)...
In this note, the rate of growth of digits in the Lüroth expansion of an irrational number is studie...
AbstractFor any formal Laurent series x=∑n=v∞cnz−n with coefficients cn lying in some given finite f...
Let be a real number. For a function , define to be the set of such that for infinitely many...
The main aim of this paper is to develop extreme value theory for $\theta$-expansions. We get the li...
AbstractThe set L of essentially non-normal numbers of the unit interval (i.e., the set of real numb...
AbstractIn this paper the sum-level sets for Lüroth expansion are introduced. We prove that the Lebe...
We investigate some Diophantine approximation constants related to the simultaneous approximation of...
AbstractIn this paper we apply the techniques and results from the theory of multifractal divergence...
Abstract. In this note we consider the Lüroth expansion of a real number, and we study the Hausdorf...
AbstractIn this note we consider the Lüroth expansion of a real number, and we study the Hausdorff d...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
summary:It is well known that every $x\in (0,1]$ can be expanded to an infinite Lüroth series in the...
We describe how the multifractal analysis of dynamical systems can be used to compute the Hausdorff ...
Let $\{x_n\}_{n\geq 0}$ be a sequence of $[0,1]^d$, $\{\lambda_n\} _{n\geq 0}$ a sequence of positiv...
We study the sets DF(β) of digit frequencies of β-expansions of numbers in [0,1]. We show that DF(β)...
In this note, the rate of growth of digits in the Lüroth expansion of an irrational number is studie...
AbstractFor any formal Laurent series x=∑n=v∞cnz−n with coefficients cn lying in some given finite f...
Let be a real number. For a function , define to be the set of such that for infinitely many...
The main aim of this paper is to develop extreme value theory for $\theta$-expansions. We get the li...
AbstractThe set L of essentially non-normal numbers of the unit interval (i.e., the set of real numb...
AbstractIn this paper the sum-level sets for Lüroth expansion are introduced. We prove that the Lebe...
We investigate some Diophantine approximation constants related to the simultaneous approximation of...
AbstractIn this paper we apply the techniques and results from the theory of multifractal divergence...