Add to ORKGNecessary and suffi cient conditions are given in order that an in terval excha.nge map satisfying Keane's infinite a.nd di stinct orbit COlldition be uniquely ergodi c. This is done through the dcvelopment of a t heory for interval exchange maps thai parallcls the classical thcory of continued fractions
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
The two-dimensional homogeneous Euclidean algorithm is the central motivation for the defi-nition of...
Some basic facts of innite ergodic theory are reviewed in a form suitable to be applied to interval ...
Necessary and suffi cient conditions are given in order that an in terval excha.nge map satisfying K...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
An explidt formula for an ergodic cr-finite measure inva.ria.nt by the Gauss map associated to a new...
AbstractWe prove that if (I, f) has a uniquely subsystem (X, f|x, α), then for every s ⊲ fα, (I, f) ...
A natural generalization of interval exchange maps are linear involutions, first introduced by Danth...
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic if...
Abstract. We study the ergodic properties of compositions of interval exchange transforma-tions and ...
We study the ergodic properties of compositions of interval exchange transformations (IETs) and rota...
International audienceFor a class of d-interval exchange transformations, whichwe call the symmetric...
AbstractSuppose f is a map from an interval [a,b] into itself with a periodic orbit consisting of th...
Abstract. We consider iterates of maps of an interval to itself and their stable periodic orbits. Wh...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
The two-dimensional homogeneous Euclidean algorithm is the central motivation for the defi-nition of...
Some basic facts of innite ergodic theory are reviewed in a form suitable to be applied to interval ...
Necessary and suffi cient conditions are given in order that an in terval excha.nge map satisfying K...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
An explidt formula for an ergodic cr-finite measure inva.ria.nt by the Gauss map associated to a new...
AbstractWe prove that if (I, f) has a uniquely subsystem (X, f|x, α), then for every s ⊲ fα, (I, f) ...
A natural generalization of interval exchange maps are linear involutions, first introduced by Danth...
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic if...
Abstract. We study the ergodic properties of compositions of interval exchange transforma-tions and ...
We study the ergodic properties of compositions of interval exchange transformations (IETs) and rota...
International audienceFor a class of d-interval exchange transformations, whichwe call the symmetric...
AbstractSuppose f is a map from an interval [a,b] into itself with a periodic orbit consisting of th...
Abstract. We consider iterates of maps of an interval to itself and their stable periodic orbits. Wh...
A unified introduction to the dynamics of interval exchange maps and related topics, such as the geo...
The two-dimensional homogeneous Euclidean algorithm is the central motivation for the defi-nition of...
Some basic facts of innite ergodic theory are reviewed in a form suitable to be applied to interval ...