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Gaussian Behavior of Quadratic Irrationals
- Publication Year :
- 2017
- Publisher :
- arXiv, 2017.
-
Abstract
- We study the probabilistic behaviour of the continued fraction expansion of a quadratic irrational number, when weighted by some "additive" cost. We prove asymptotic Gaussian limit laws, with an optimal speed of convergence. We deal with the underlying dynamical system associated with the Gauss map, and its weighted periodic trajectories. We work with analytic combinatorics methods, and mainly with bivariate Dirichlet generating functions; we use various tools, from number theory (the Landau Theorem), from probability (the Quasi-Powers Theorem), or from dynamical systems: our main object of study is the (weighted) transfer operator, that we relate with the generating functions of interest. The present paper exhibits a strong parallelism with the methods which have been previously introduced by Baladi and Vall\'ee in the study of rational trajectories. However, the present study is more involved and uses a deeper functional analysis framework.<br />Comment: 39 pages In this second version, we have added an annex that provides a detailed study of the trace of the weighted transfer operator. We have also corrected an error that appeared in the computation of the norm of the operator when acting in the Banach space of analytic functions defined in the paper. Also, we give a simpler proof for Theorem 3
- Subjects :
- Algebra and Number Theory
Dynamical systems theory
Mathematics - Number Theory
Gaussian
010102 general mathematics
Probability (math.PR)
Dynamical Systems (math.DS)
Dynamical system
01 natural sciences
11M36 37D20 60F05
symbols.namesake
Quadratic equation
Number theory
Transfer operator
symbols
FOS: Mathematics
Analytic combinatorics
Applied mathematics
Number Theory (math.NT)
0101 mathematics
Mathematics - Dynamical Systems
Continued fraction
Mathematics - Probability
Mathematics
Subjects
Details
- Database :
- OpenAIRE
- Accession number :
- edsair.doi.dedup.....560394231aef42dad4d10d75dd6198e3
- Full Text :
- https://doi.org/10.48550/arxiv.1708.00051