extQuantile: Value-at-Risk (VaR) or Extreme Quantile (EQ) Estimation

A list with elements:

• ExtQHat: an estimate of the VaR or \(\tau'_n\)-th quantile;

• VarExQHat: an estimate of the asymptotic variance of the VaR estimator;

• CIExtQ: an estimate of the approximate \((1-\alpha)100\%\) confidence interval for the VaR.

For a dataset data of sample size \(n\), the VaR or EQ, correspoding to the extreme level tau1, is computed by applying the Weissman estimator. The definition of the Weissman estimator depends on the estimation of the tail index \(\gamma\). Here, \(\gamma\) is estimated using the Hill estimation (see HTailIndex). The observations can be either independent or temporal dependent (see e.g. de Haan and Ferreira 2006; Drees 2003; de Haan et al. 2016 for details).

• The so-called intermediate level tau or \(\tau_n\) is a sequence of positive reals such that \(\tau_n \to 1\) as \(n \to \infty\). Practically, \((1-\tau_n)\in (0,1)\) is a small proportion of observations in the observed data sample that exceed the \(tau_n\)-th empirical quantile. Such proportion of observations is used to estimate the \(tau_n\)-th quantile and \(\gamma\).

• The so-called extreme level tau1 or \(\tau'_n\) is a sequence of positive reals such that \(\tau'_n \to 1\) as \(n \to \infty\). The value \((1-tau'_n) \in (0,1)\) is meant to be a small tail probability such that \((1-\tau'_n)=1/n\) or \((1-\tau'_n) < 1/n\). It is also assumed that \(n(1-\tau'_n) \to C\) as \(n \to \infty\), where \(C\) is a positive finite constant. The value \(C\) is the expected number of exceedances of the \(\tau'_n\)-th quantile. Typically, \(C \in (0,1)\) which means that it is expected that there are no observations in a data sample exceeding the quantile of level \((1-\tau_n')\).

• If var=TRUE then an estimate of the asymptotic variance of the \(tau'_n\)-th quantile is computed. With independent observations the asymptotic variance is estimated by the formula \(\hat{\gamma}^2\) (see e.g. de Drees 2000, 2003, for details). This is achieved through varType="asym-Ind". With serial dependent data the asymptotic variance is estimated by the formula in 1288 in Drees (2000). This is achieved through varType="asym-Dep". In this latter case the computation of the serial dependence is based on the "big blocks seperated by small blocks" techinque which is a standard tools in time series, see e.g. Leadbetter et al. (1986). The size of the big and small blocks are specified by the parameters bigBlock and smallBlock, respectively. With serial dependent data the asymptotic variance can also be estimated by formula (32) of Drees (2003). This is achieved through varType="asym-Alt-Dep".

• If bias=TRUE then an estimate of the \(\tau'_n\)--th quantile is computed using the formula in page 330 of de Haan et al. (2016), which provides a bias corrected version of the Weissman estimator. However, in this case the asymptotic variance is not estimated using the formula in Haan et al. (2016) Theorem 4.2. Instead, for simplicity standard formula in Drees (2000) page 1288 is used.

• k or \(k_n\) is the value of the so-called intermediate sequence \(k_n\), \(n=1,2,\ldots\). Its represents a sequence of positive integers such that \(k_n \to \infty\) and \(k_n/n \to 0\) as \(n \to \infty\). Practically, the value \(k_n\) specifies the number of k\(+1\) larger order statistics to be used to estimate the \(\tau_n\)-th empirical quantile and \(\gamma\). The intermediate level \(\tau_n\) can be seen defined as \(\tau_n=1-k_n/n\).

• Given a small value \(\alpha\in (0,1)\) then an estimate of an asymptotic confidence interval for \(tau'_n\)-th quantile, with approximate nominal confidence level \((1-\alpha)100\%\), is computed. The confidence intervals are computed exploiting the formulas (33) and (46) of Drees (2003). When biast=TRUE confidence intervals are computed in the same way but after correcting the tail index estimate by an estimate of the bias term, see formula (4.2) in de Haan et al. (2016) for details. Furthermore, in this case with serial dependent data the asymptotic variance is estimated using the formula in Drees (2000) page 1288.