AbstractFor an irrational rotation, we use the symbolic dynamics on the sturmian coding to compute explicitly, according to the continued fraction approximation of the argument, the measure of the largest Rokhlin stack made with intervals, and the measure of the largest Rokhlin stack whose levels have one name for the coding. Each one of these measures is equal to one if and only if the argument has unbounded partial quotients
We prove quantitative statistical stability results for a large class of small C-0 perturbations of ...
We apply the dynamical method to obtain structural results concerning certain classes of one-dimensi...
AbstractThe techniques of topological dynamics and differential-dynamical systems are used to study ...
AbstractFor an irrational rotation, we use the symbolic dynamics on the sturmian coding to compute e...
AbstractWe discuss combinatorial properties of a class of binary sequences generalizing Sturmian seq...
In present work we study connection between irrational rotations of the unit interval and infinite w...
AbstractGiven a rotation of the circle, we study the complexity of formal languages that are generat...
A degree c rotation set in [0, 1] is an ordered set {t1, . . . , tq} such that there is apositive in...
International audienceWe compute two invariants of topological conjugacy, the upper and lower limits...
In the space of binary sequences, minimal sets, that is: sets invariant under the shift operation, t...
AbstractWe study computability of real-valued functions and the information needed for simulation of...
We prove quantitative statistical stability results for a large class of small C0 perturbations of c...
Abstract. We consider the problem of planar rotation by an irrational angle, where the space is disc...
The first result of the paper (Theorem 1.1) is an explicit construction of unimodal maps that are se...
International audienceLet 0 lambda x + delta mod 1, where 0 <= delta < 1. Let rho be the rotation n...
We prove quantitative statistical stability results for a large class of small C-0 perturbations of ...
We apply the dynamical method to obtain structural results concerning certain classes of one-dimensi...
AbstractThe techniques of topological dynamics and differential-dynamical systems are used to study ...
AbstractFor an irrational rotation, we use the symbolic dynamics on the sturmian coding to compute e...
AbstractWe discuss combinatorial properties of a class of binary sequences generalizing Sturmian seq...
In present work we study connection between irrational rotations of the unit interval and infinite w...
AbstractGiven a rotation of the circle, we study the complexity of formal languages that are generat...
A degree c rotation set in [0, 1] is an ordered set {t1, . . . , tq} such that there is apositive in...
International audienceWe compute two invariants of topological conjugacy, the upper and lower limits...
In the space of binary sequences, minimal sets, that is: sets invariant under the shift operation, t...
AbstractWe study computability of real-valued functions and the information needed for simulation of...
We prove quantitative statistical stability results for a large class of small C0 perturbations of c...
Abstract. We consider the problem of planar rotation by an irrational angle, where the space is disc...
The first result of the paper (Theorem 1.1) is an explicit construction of unimodal maps that are se...
International audienceLet 0 lambda x + delta mod 1, where 0 <= delta < 1. Let rho be the rotation n...
We prove quantitative statistical stability results for a large class of small C-0 perturbations of ...
We apply the dynamical method to obtain structural results concerning certain classes of one-dimensi...
AbstractThe techniques of topological dynamics and differential-dynamical systems are used to study ...
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