DOIAbstract
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic iff ƒ has at most one periodic orbit
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic iff ƒ has at most one periodic orbit
AbstractWe prove the following three results. We denote by Per(f) the set of all periods of a self-m...
We study quasiperiodically forced circle endomorphisms, homotopic to the identity, and show that und...
We study the existence Of Solutions g to the functional inequality f <= g circle T - g + beta where ...
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic if...
37 pages, 5 figures. Comments are welcomeInternational audienceWe give conditions that characterize ...
Abstract The self-maps on the circle having periodic orbits with least period 3 are classified into ...
The self-maps on the circle having periodic orbits with least period 3 are classified into relative ...
Necessary and suffi cient conditions are given in order that an in terval excha.nge map satisfying K...
AbstractWe prove that if (I, f) has a uniquely subsystem (X, f|x, α), then for every s ⊲ fα, (I, f) ...
Abstract. We give a description of ergodic components of SRB measures in terms of ergodic homoclinic...
The continuous self maps of a closed interval of the real line with zero topological entropy can be ...
ABSTRACT. Given a continuous map é from the circle S to itself we want to find all self-maps õ: S! S...
Abstract. Let K be the Cantor set. We prove that arbitrarily close to a homeomorphism T: K → K there...
AbstractLet (Σ,ρ) denote the one-sided symbolic space (with two symbols), σ the shift on Σ, A(·) the...
Let G be a graph and f be a continuous self-map on G. We present new and known results (from another...
AbstractWe prove the following three results. We denote by Per(f) the set of all periods of a self-m...
We study quasiperiodically forced circle endomorphisms, homotopic to the identity, and show that und...
We study the existence Of Solutions g to the functional inequality f <= g circle T - g + beta where ...
AbstractLet ƒ: S1 → S1 be a continuous self-map of the circle. We show that ƒ is uniquely ergodic if...
37 pages, 5 figures. Comments are welcomeInternational audienceWe give conditions that characterize ...
Abstract The self-maps on the circle having periodic orbits with least period 3 are classified into ...
The self-maps on the circle having periodic orbits with least period 3 are classified into relative ...
Necessary and suffi cient conditions are given in order that an in terval excha.nge map satisfying K...
AbstractWe prove that if (I, f) has a uniquely subsystem (X, f|x, α), then for every s ⊲ fα, (I, f) ...
Abstract. We give a description of ergodic components of SRB measures in terms of ergodic homoclinic...
The continuous self maps of a closed interval of the real line with zero topological entropy can be ...
ABSTRACT. Given a continuous map é from the circle S to itself we want to find all self-maps õ: S! S...
Abstract. Let K be the Cantor set. We prove that arbitrarily close to a homeomorphism T: K → K there...
AbstractLet (Σ,ρ) denote the one-sided symbolic space (with two symbols), σ the shift on Σ, A(·) the...
Let G be a graph and f be a continuous self-map on G. We present new and known results (from another...
AbstractWe prove the following three results. We denote by Per(f) the set of all periods of a self-m...
We study quasiperiodically forced circle endomorphisms, homotopic to the identity, and show that und...
We study the existence Of Solutions g to the functional inequality f <= g circle T - g + beta where ...
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