Add to ORKGWe investigate extreme value theory of a class of random sequences defined by the all-time suprema of aggregated self-similar Gaussian processes with trend. This study is motivated by its potential applications in various areas and its theoretical interestingness. We consider both stationary sequences and non-stationary sequences obtained by considering whether the trend functions are identical or not. We show that a sequence of suitably normalised $k$th order statistics converges in distribution to a limiting random variable which can be a negative log transformed Erlang distributed random variable, a Normal random variable or a mixture of them, according to three conditions deduced through the model parameters. Remarkably, this phenomenon...
This paper contains the results concerning the weak convergence of d-dimensional extreme order stati...
We consider a sequence ([xi]n)n>=1 of i.i.d. random values residing in the domain of attraction of a...
AbstractWe consider a sequence (ξn)n≥1 of i.i.d. random values residing in the domain of attraction ...
We investigate extreme value theory of a class of random sequences defined by the all-time suprema o...
AbstractSuppose that {ξj} is a strictly stationary sequence which satisfies the strong mixing condit...
In this thesis, we introduce asymptotic distribution and statistical theories of extreme values (max...
AbstractLet {Xi, i⩾0} be a sequence of independent identically distributed random variables with fin...
In the article the outline of asymptotic theory of extreme values has been intro-duced for the appli...
In this paper, we study the asymptotic distribution of the maxima of suprema of dependent Gaussian p...
AbstractA distributional mixing condition is introduced for stationary sequences of random vectors t...
We study the extreme value distribution of stochastic processes modeled by superstatistics. Classica...
The analysis of the set of extreme random variables models is still an extremely topical topic in ma...
Abstract. We consider a strictly stationary sequence of random vectors whose finite-dimensional dist...
We consider the extreme value theory for a stationary GARCH process with iid innovations. One of the...
This paper proves weak convergence in D of the tail empirical process – the renormalized extreme tai...
This paper contains the results concerning the weak convergence of d-dimensional extreme order stati...
We consider a sequence ([xi]n)n>=1 of i.i.d. random values residing in the domain of attraction of a...
AbstractWe consider a sequence (ξn)n≥1 of i.i.d. random values residing in the domain of attraction ...
We investigate extreme value theory of a class of random sequences defined by the all-time suprema o...
AbstractSuppose that {ξj} is a strictly stationary sequence which satisfies the strong mixing condit...
In this thesis, we introduce asymptotic distribution and statistical theories of extreme values (max...
AbstractLet {Xi, i⩾0} be a sequence of independent identically distributed random variables with fin...
In the article the outline of asymptotic theory of extreme values has been intro-duced for the appli...
In this paper, we study the asymptotic distribution of the maxima of suprema of dependent Gaussian p...
AbstractA distributional mixing condition is introduced for stationary sequences of random vectors t...
We study the extreme value distribution of stochastic processes modeled by superstatistics. Classica...
The analysis of the set of extreme random variables models is still an extremely topical topic in ma...
Abstract. We consider a strictly stationary sequence of random vectors whose finite-dimensional dist...
We consider the extreme value theory for a stationary GARCH process with iid innovations. One of the...
This paper proves weak convergence in D of the tail empirical process – the renormalized extreme tai...
This paper contains the results concerning the weak convergence of d-dimensional extreme order stati...
We consider a sequence ([xi]n)n>=1 of i.i.d. random values residing in the domain of attraction of a...
AbstractWe consider a sequence (ξn)n≥1 of i.i.d. random values residing in the domain of attraction ...