Add to ORKGInternational audienceWe give a characterization of sets K of probability measures on a Cantor space X with the property that there exists a minimal homeomorphism g of X such that the set of g-invariant probability measures on X coincides with K. This extends theorems of Akin (corresponding to the case when K is a singleton) and Dahl (when K is finite-dimensional). Our argument is elementary and different from both Akin's and Dahl's
We study Cantor sets which occur as minimal sets for homeomorphisms of R n. The minimality is modell...
We give conditions which, given two Bernoulli trial measures, determine whether there exists a homeo...
The class of all invariant measures of a transformation, or a flow, is an important aspect of its dy...
International audienceWe give a characterization of sets K of probability measures on a Cantor space...
International audienceWe simplify a criterion (due to Ibarlucía and the author) which characterizes ...
AbstractWe study the set S of ergodic probability Borel measures on stationary non-simple Bratteli d...
In this work we study some dynamical properties of symbolic dynamical systems, with particular empha...
We study Cantor sets which occur as minimal sets for homeomorphisms of R^n. The minimality is modell...
ln this paper we will show that for any Cantor minimal system (X,φ), any potential function f and an...
International audienceWe study full groups of minimal actions of countable groups by homeomorphisms ...
We prove that for any countable group Γ there exists a free minimal continuous action α : Γ → C on t...
In this paper we show that, for every Choquet simplex K and for every d > 1, there exists a Z(d)-Toe...
This thesis gathers different works approaching subjects of topological dynamics by means of logic a...
Mary Rees has constructed a minimal homeomorphism of the 2-torus with positive topological entropy. ...
Abstract. We give sufficient conditions for a group of homeomorphisms of a compact Hausdorff space t...
We study Cantor sets which occur as minimal sets for homeomorphisms of R n. The minimality is modell...
We give conditions which, given two Bernoulli trial measures, determine whether there exists a homeo...
The class of all invariant measures of a transformation, or a flow, is an important aspect of its dy...
International audienceWe give a characterization of sets K of probability measures on a Cantor space...
International audienceWe simplify a criterion (due to Ibarlucía and the author) which characterizes ...
AbstractWe study the set S of ergodic probability Borel measures on stationary non-simple Bratteli d...
In this work we study some dynamical properties of symbolic dynamical systems, with particular empha...
We study Cantor sets which occur as minimal sets for homeomorphisms of R^n. The minimality is modell...
ln this paper we will show that for any Cantor minimal system (X,φ), any potential function f and an...
International audienceWe study full groups of minimal actions of countable groups by homeomorphisms ...
We prove that for any countable group Γ there exists a free minimal continuous action α : Γ → C on t...
In this paper we show that, for every Choquet simplex K and for every d > 1, there exists a Z(d)-Toe...
This thesis gathers different works approaching subjects of topological dynamics by means of logic a...
Mary Rees has constructed a minimal homeomorphism of the 2-torus with positive topological entropy. ...
Abstract. We give sufficient conditions for a group of homeomorphisms of a compact Hausdorff space t...
We study Cantor sets which occur as minimal sets for homeomorphisms of R n. The minimality is modell...
We give conditions which, given two Bernoulli trial measures, determine whether there exists a homeo...
The class of all invariant measures of a transformation, or a flow, is an important aspect of its dy...