For non-uniformly hyperbolic dynamical systems we consider the time series of maxima along typical orbits. Using ideas based upon quantitative recurrence time statistics we prove convergence of the maxima (under suitable normalization) to an extreme value distribution, and obtain estimates on the rate of convergence. We show that our results are applicable to a range of examples, and include new results for Lorenz maps, certain partially hyperbolic systems, and non-uniformly expanding systems with sub-exponential decay of correlations. For applications where analytic results are not readily available we show how to estimate the rate of convergence to an extreme value distribution based upon numerical information of the quantitative recurren...
We consider the extreme value theory of a hyperbolic toral automorphism T : T2 → T2 showing that, i...
Suppose ( f, X, µ) is a measure preserving dynamical system and φ: X → R a measurable observable. Le...
In this thesis, we study the quantitative recurrence properties of some dynamical systems preserving...
For non-uniformly hyperbolic dynamical systems we consider the time series of maxima along typical o...
For a measure-preserving dynamical system (X, ƒ, μ), we consider the time series of maxima Mn = max{...
In this paper we perform an analytical and numerical study of Extreme Value distributions in discret...
Motivated by proofs in extreme value theory, we investigate the statistical properties of certain ch...
In this paper we perform an analytical and numerical study of Extreme Value distri-butions in discre...
Abstract. We study the distribution of maxima (Extreme Value Statistics) for sequences of observable...
Extreme value theory for chaotic deterministic dynamical systems is a rapidly expanding area of rese...
We consider discrete time dynamical systems and show the link between Hitting Time Statistics (the d...
The main results of the extreme value theory developed for the investigation of the observables of d...
International audienceWe study the distribution of maxima (extreme value statistics) for sequences o...
We consider the extreme value theory of a hyperbolic toral automorphism T : T2 → T2 showing that, i...
Suppose ( f, X, µ) is a measure preserving dynamical system and φ: X → R a measurable observable. Le...
In this thesis, we study the quantitative recurrence properties of some dynamical systems preserving...
For non-uniformly hyperbolic dynamical systems we consider the time series of maxima along typical o...
For a measure-preserving dynamical system (X, ƒ, μ), we consider the time series of maxima Mn = max{...
In this paper we perform an analytical and numerical study of Extreme Value distributions in discret...
Motivated by proofs in extreme value theory, we investigate the statistical properties of certain ch...
In this paper we perform an analytical and numerical study of Extreme Value distri-butions in discre...
Abstract. We study the distribution of maxima (Extreme Value Statistics) for sequences of observable...
Extreme value theory for chaotic deterministic dynamical systems is a rapidly expanding area of rese...
We consider discrete time dynamical systems and show the link between Hitting Time Statistics (the d...
The main results of the extreme value theory developed for the investigation of the observables of d...
International audienceWe study the distribution of maxima (extreme value statistics) for sequences o...
We consider the extreme value theory of a hyperbolic toral automorphism T : T2 → T2 showing that, i...
Suppose ( f, X, µ) is a measure preserving dynamical system and φ: X → R a measurable observable. Le...
In this thesis, we study the quantitative recurrence properties of some dynamical systems preserving...