English

On approximation by random L\"uroth expansions

Dynamical Systems 2021-01-07 v1

Abstract

We introduce a family of random cc-L\"uroth transformations {Lc}c[0,12]\{L_c\}_{c \in [0, \frac12]}, obtained by randomly combining the standard and alternating L\"uroth maps with probabilities pp and 1p1-p, 0<p<10 < p < 1, both defined on the interval [c,1][c,1]. We prove that the pseudo-skew product map LcL_c produces for each c25c \le \frac25 and for Lebesgue almost all x[c,1]x \in [c,1] uncountably many different generalised L\"uroth expansions that can be investigated simultaneously. Moreover, for c=1c= \frac1{\ell}, for N3{}\ell \in \mathbb{N}_{\geq 3} \cup \{\infty\}, Lebesgue almost all xx have uncountably many universal generalised L\"uroth expansions with digits less than or equal to \ell. For c=0c=0 we show that typically the speed of convergence to an irrational number xx, of the sequence of L\"uroth approximants generated by L0L_0, is equal to that of the standard L\"uroth approximants; and that the quality of the approximation coefficients depends on pp and varies continuously between the values for the alternating and the standard L\"uroth map. Furthermore, we show that for each cQc \in \mathbb Q the map LcL_c admits a Markov partition. For specific values of c>0c>0, we compute the density of the stationary measure and we use it to study the typical speed of convergence of the approximants and the digit frequencies.

Keywords

Cite

@article{arxiv.2101.01982,
  title  = {On approximation by random L\"uroth expansions},
  author = {Charlene Kalle and Marta Maggioni},
  journal= {arXiv preprint arXiv:2101.01982},
  year   = {2021}
}
R2 v1 2026-06-23T21:50:06.729Z