Motivated by examples from extreme value theory we introduce the general notion of a cluster process as a limiting point process of returns of a certain event in a time series. We explore general invariance properties of cluster processes which are implied by stationarity of the underlying time series under minimal assumptions. Of particular interest are the cluster size distributions, where we introduce the two notions of inspected and typical cluster sizes and derive general properties of and connections between them. While the extremal index commonly used in extreme value theory is often interpreted as the inverse of a "mean cluster size", we point out that this only holds true for the expected value of the typical cluster size, caused b...
We consider stationary stochastic processes arising from dynamical systems by evaluating a given obs...
In a stationary sequence of random variables, high-threshold exceedances may cluster together.Two ap...
The extremes of a stationary time series typically occur in clusters. A primary measure for this ph...
Motivated by examples from extreme value theory we introduce the general notion of a cluster process...
International audienceFor a wide class of stationary time series, extreme value theory provides limi...
Extremes occur in stationary regularly varying time series as short periods with several large obser...
The study of clusters of extreme values of a time series (exceedances over a suf-ficiently high thre...
We consider stochastic processes arising from dynamical systems by evaluating an observable function...
AbstractThe extremal index appears as a parameter in Extreme Value Laws for stochastic processes, ch...
The extremal index (?) is the key parameter for extending extreme value theory results from i.i.d. t...
The extremal index appears as a parameter in Extreme Value Laws for stochastic processes, characteri...
In the regularly varying time series setting, a cluster of exceedances is a short period for which t...
AbstractWe consider general nonstationary max-autoregressive sequences Xi, i ⩾ 1, with Xi = Zimax(Xi...
AbstractIn this paper the estimation of certain parameters of the extreme order statistics of statio...
AbstractMany real-life time series exhibit clusters of outlying observations that cannot be adequate...
We consider stationary stochastic processes arising from dynamical systems by evaluating a given obs...
In a stationary sequence of random variables, high-threshold exceedances may cluster together.Two ap...
The extremes of a stationary time series typically occur in clusters. A primary measure for this ph...
Motivated by examples from extreme value theory we introduce the general notion of a cluster process...
International audienceFor a wide class of stationary time series, extreme value theory provides limi...
Extremes occur in stationary regularly varying time series as short periods with several large obser...
The study of clusters of extreme values of a time series (exceedances over a suf-ficiently high thre...
We consider stochastic processes arising from dynamical systems by evaluating an observable function...
AbstractThe extremal index appears as a parameter in Extreme Value Laws for stochastic processes, ch...
The extremal index (?) is the key parameter for extending extreme value theory results from i.i.d. t...
The extremal index appears as a parameter in Extreme Value Laws for stochastic processes, characteri...
In the regularly varying time series setting, a cluster of exceedances is a short period for which t...
AbstractWe consider general nonstationary max-autoregressive sequences Xi, i ⩾ 1, with Xi = Zimax(Xi...
AbstractIn this paper the estimation of certain parameters of the extreme order statistics of statio...
AbstractMany real-life time series exhibit clusters of outlying observations that cannot be adequate...
We consider stationary stochastic processes arising from dynamical systems by evaluating a given obs...
In a stationary sequence of random variables, high-threshold exceedances may cluster together.Two ap...
The extremes of a stationary time series typically occur in clusters. A primary measure for this ph...