32 pagesInternational audienceWe study the probabilistic behavior 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 bivariate Dirichlet generating functions; we use various tools, from number theory (the Landau Theorem), probability (the Quasi-Powers Theorem), or dynamical systems: our main object of study is the (weighted) transfer operator, which we relate to the generating functions of interest. The present paper exhibits strong para...
In the paper a weighted quadratic variation based on a sequence of partitions for a class of Gaussia...
AbstractHere we prove that every real quadratic irrational α can be expressed as a periodic non-simp...
We derive Plancherel-Rotach asymptotic expansions for the q -1 -Hermite, q-Laguerre, and Stieltjes-W...
It is conjectured that the length of continued fraction behaves asymptotically like a random variabl...
International audienceWe study the limiting distributions of Birkhoff sums of a large class of cost ...
AbstractWe obtain a central limit theorem for a general class of additive parameters (costs, observa...
Abstract. We obtain a Central Limit Theorem for a general class of addi-tive parameters (costs, obse...
We describe various properties of continued fraction expansions of complex numbers in terms of Gauss...
For a given irrational x, the Gauss map, T( x) = 〈1/x〉, provides an infinite sequence of rational ap...
We study a family of continued fraction expansion of reals from the unit interval. The Perron-Froben...
Quadratic irrationals and their representation as continued fractions are investigated by means of p...
We record two remarks on the work of Baladi???Vall??e [J. Number Theory 110 (2005), 331???386]. They...
Generalizing from the case of golden mean frequency to a wider class of quadratic irrationals, we ex...
The continued fraction expansion of a real number may be studied by considering a suitable discrete...
We provide here a complete average-case analysis of the binary continued fraction representation of ...
In the paper a weighted quadratic variation based on a sequence of partitions for a class of Gaussia...
AbstractHere we prove that every real quadratic irrational α can be expressed as a periodic non-simp...
We derive Plancherel-Rotach asymptotic expansions for the q -1 -Hermite, q-Laguerre, and Stieltjes-W...
It is conjectured that the length of continued fraction behaves asymptotically like a random variabl...
International audienceWe study the limiting distributions of Birkhoff sums of a large class of cost ...
AbstractWe obtain a central limit theorem for a general class of additive parameters (costs, observa...
Abstract. We obtain a Central Limit Theorem for a general class of addi-tive parameters (costs, obse...
We describe various properties of continued fraction expansions of complex numbers in terms of Gauss...
For a given irrational x, the Gauss map, T( x) = 〈1/x〉, provides an infinite sequence of rational ap...
We study a family of continued fraction expansion of reals from the unit interval. The Perron-Froben...
Quadratic irrationals and their representation as continued fractions are investigated by means of p...
We record two remarks on the work of Baladi???Vall??e [J. Number Theory 110 (2005), 331???386]. They...
Generalizing from the case of golden mean frequency to a wider class of quadratic irrationals, we ex...
The continued fraction expansion of a real number may be studied by considering a suitable discrete...
We provide here a complete average-case analysis of the binary continued fraction representation of ...
In the paper a weighted quadratic variation based on a sequence of partitions for a class of Gaussia...
AbstractHere we prove that every real quadratic irrational α can be expressed as a periodic non-simp...
We derive Plancherel-Rotach asymptotic expansions for the q -1 -Hermite, q-Laguerre, and Stieltjes-W...