AbstractWe investigate the connection between the dynamical Borel-Cantelli and waiting time results. We prove that if a system has the dynamical Borel-Cantelli property, then the time needed to enter for the first time in a sequence of small balls scales as the inverse of the measure of the balls. Conversely if we know the waiting time behavior of a system we can prove that certain sequences of decreasing balls satisfies the Borel-Cantelli property. This allows to obtain Borel-Cantelli like results in systems like axiom A and generic interval exchanges
AbstractA generalisation of a waiting-time relation is developed by the use of Laplace transform the...
The first chapter, devoted to random systems, we establish an abstract functional framework, includi...
We study returns in dynamical systems: when a set of points, initially populating a prescribed regi...
We investigate the connection between the dynamical Borel-Cantelli and waiting time results. We prov...
AbstractWe investigate the connection between the dynamical Borel-Cantelli and waiting time results....
Let (X k) be a strictly stationary sequence of random variables with values in some Polish space E a...
The classical Borel–Cantelli lemma is a beautiful discovery with wide applications in the mathematic...
Abstract. Let (Bi) be a sequence of measurable sets in a probability space (X,B, µ) such that ∑∞n=1 ...
Abstract. Let (An)∞n=1 be a sequence of sets in a probability space (X,B, µ) such that P∞ n=1 µ(An) ...
Different methods for computing transient lengths in chaotic systems can give very different answers...
We prove that if a system has superpolynomial (faster than any power law) decay of correlations then...
In the present paper we study the behaviour of normalized waiting times for linear irrational rotati...
In the study of some dynamical systems the limsup set of a sequence of measurable sets is often of i...
Abstract In this paper we prove two variants of the well-known Filippov-Pliss lemma in the case of d...
AbstractIn this paper we investigate the dynamic Cauchy problem in Banach spaces. We check how dense...
AbstractA generalisation of a waiting-time relation is developed by the use of Laplace transform the...
The first chapter, devoted to random systems, we establish an abstract functional framework, includi...
We study returns in dynamical systems: when a set of points, initially populating a prescribed regi...
We investigate the connection between the dynamical Borel-Cantelli and waiting time results. We prov...
AbstractWe investigate the connection between the dynamical Borel-Cantelli and waiting time results....
Let (X k) be a strictly stationary sequence of random variables with values in some Polish space E a...
The classical Borel–Cantelli lemma is a beautiful discovery with wide applications in the mathematic...
Abstract. Let (Bi) be a sequence of measurable sets in a probability space (X,B, µ) such that ∑∞n=1 ...
Abstract. Let (An)∞n=1 be a sequence of sets in a probability space (X,B, µ) such that P∞ n=1 µ(An) ...
Different methods for computing transient lengths in chaotic systems can give very different answers...
We prove that if a system has superpolynomial (faster than any power law) decay of correlations then...
In the present paper we study the behaviour of normalized waiting times for linear irrational rotati...
In the study of some dynamical systems the limsup set of a sequence of measurable sets is often of i...
Abstract In this paper we prove two variants of the well-known Filippov-Pliss lemma in the case of d...
AbstractIn this paper we investigate the dynamic Cauchy problem in Banach spaces. We check how dense...
AbstractA generalisation of a waiting-time relation is developed by the use of Laplace transform the...
The first chapter, devoted to random systems, we establish an abstract functional framework, includi...
We study returns in dynamical systems: when a set of points, initially populating a prescribed regi...