When studying a real-life time series, it is frequently reasonable to assume, possibly after a suitable transformation, that the data come from a stationary time series (Xt). This means that the finite-dimensional distributions of this sequence are invariant under shifts of time. Various stationary time series models have been studied in detail in the literature. A standard assumption is that the time series is Gaussian or, more generally, that it has a probability distribution with light tails, in the sense that P(lXtl > x) decays to zero at least exponentially. Zie: Summary
The detection of long-range dependence in time series analysis is an important task to which this pa...
Time series analysis generally referred to any analysis which involved to a time series data. In thi...
A framework is proposed for the analysis of non-Gaussian time series under the Gaussian assumption. ...
When studying a real-life time series, it is frequently reasonable to assume, possibly after a suita...
X = {Xt, t ∈ N} is a (LRD) time series. N number of discrete observations of X. γ(k) is the autocova...
We explain the connection between autocorrelation functions of stationary continuous time processes ...
The second order properties of a process are usually characterized by the autocovariance function. I...
Some stationary and non-stationary time series arise from mixed distributions, the probabilities att...
The classical autocorrelation function may not be an effective and informative means in revealing th...
The detection of long-range dependence in time series analysis is an important task to which this pa...
AbstractWe consider a stationary time series {Xt} given byXt=∑∞k=−∞ψkZt−k, where {Zt} is a strictly ...
It is shown that the sum of the sample autocorrelation function at lag h≥1 is always for any statio...
In second-order statistical inference, an interval estimate of autocorrelation is a convenient repor...
The behaviour of the sample autocorrelation coefficients is important for the identification of the ...
This thesis provides a necessary and sufficient condition for asymptotic efficiency of a nonparametr...
The detection of long-range dependence in time series analysis is an important task to which this pa...
Time series analysis generally referred to any analysis which involved to a time series data. In thi...
A framework is proposed for the analysis of non-Gaussian time series under the Gaussian assumption. ...
When studying a real-life time series, it is frequently reasonable to assume, possibly after a suita...
X = {Xt, t ∈ N} is a (LRD) time series. N number of discrete observations of X. γ(k) is the autocova...
We explain the connection between autocorrelation functions of stationary continuous time processes ...
The second order properties of a process are usually characterized by the autocovariance function. I...
Some stationary and non-stationary time series arise from mixed distributions, the probabilities att...
The classical autocorrelation function may not be an effective and informative means in revealing th...
The detection of long-range dependence in time series analysis is an important task to which this pa...
AbstractWe consider a stationary time series {Xt} given byXt=∑∞k=−∞ψkZt−k, where {Zt} is a strictly ...
It is shown that the sum of the sample autocorrelation function at lag h≥1 is always for any statio...
In second-order statistical inference, an interval estimate of autocorrelation is a convenient repor...
The behaviour of the sample autocorrelation coefficients is important for the identification of the ...
This thesis provides a necessary and sufficient condition for asymptotic efficiency of a nonparametr...
The detection of long-range dependence in time series analysis is an important task to which this pa...
Time series analysis generally referred to any analysis which involved to a time series data. In thi...
A framework is proposed for the analysis of non-Gaussian time series under the Gaussian assumption. ...