Motivated by proofs in extreme value theory, we investigate the statistical properties of certain chaotic dynamical systems, including the well-known dispersing billiard model. In particular, we prove the existence of a maximal probability distribution and rare event point process in the setting of two-dimensional hyperbolic systems with singularities. We also obtain bounds on the growth rates of Birkhoff sums with non-integrable observables, where the Birkhoff ergodic theorem fails, by using the recurrence properties of the system to a point of maximization. We end with an analysis of extreme temperatures across Texas where we find compelling evidence that the probability of observing higher summer temperature extremes has increased.Mathem...
The object of this paper is twofold. From one side we study the dichotomy, in terms of the Extremal ...
We consider discrete time dynamical systems and show the link between Hitting Time Statistics (the d...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
In this thesis, some statistical properties of two interesting problems are studied. The fir...
Abstract. We present a review of recent results regarding the existence of Extreme Value Laws for st...
We establish quantitative results for the statistical behaviour of infinite systems. We consider two...
A theory of extremes is developed for chaotic dynamical systems and illustrated on representative mo...
Abstract. We study the distribution of maxima (Extreme Value Statistics) for sequences of observable...
International audienceWe study the distribution of maxima (extreme value statistics) for sequences o...
systems: from limit theorems to concentration inequalities Jean-Rene ́ Chazottes Abstract We start b...
In this thesis, we address some questions about certain chaotic dynamical systems. In particular, th...
For non-uniformly hyperbolic dynamical systems we consider the time series of maxima along typical o...
Extreme value theory for chaotic deterministic dynamical systems is a rapidly expanding area of rese...
The principal signatures of deterministic dynamics in the probabilistic properties of extremes are i...
International audienceThe object of this paper is twofold. From one side we study the dichotomy, in ...
The object of this paper is twofold. From one side we study the dichotomy, in terms of the Extremal ...
We consider discrete time dynamical systems and show the link between Hitting Time Statistics (the d...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...
In this thesis, some statistical properties of two interesting problems are studied. The fir...
Abstract. We present a review of recent results regarding the existence of Extreme Value Laws for st...
We establish quantitative results for the statistical behaviour of infinite systems. We consider two...
A theory of extremes is developed for chaotic dynamical systems and illustrated on representative mo...
Abstract. We study the distribution of maxima (Extreme Value Statistics) for sequences of observable...
International audienceWe study the distribution of maxima (extreme value statistics) for sequences o...
systems: from limit theorems to concentration inequalities Jean-Rene ́ Chazottes Abstract We start b...
In this thesis, we address some questions about certain chaotic dynamical systems. In particular, th...
For non-uniformly hyperbolic dynamical systems we consider the time series of maxima along typical o...
Extreme value theory for chaotic deterministic dynamical systems is a rapidly expanding area of rese...
The principal signatures of deterministic dynamics in the probabilistic properties of extremes are i...
International audienceThe object of this paper is twofold. From one side we study the dichotomy, in ...
The object of this paper is twofold. From one side we study the dichotomy, in terms of the Extremal ...
We consider discrete time dynamical systems and show the link between Hitting Time Statistics (the d...
We prove large deviation principles for ergodic averages of dynamical systems admitting Markov tower...