| dc.description.abstract | In financial risk management, the expected shortfall is a popular risk measure which is often
considered as an alternative to Value-at-Risk. It is defined as the conditional expected loss given
that the loss is greater than a given Value-at-Risk (quantile). In this paper at hand, we have
proposed a new method to compute nonparametric prediction bands for Conditional Expected
Shortfall for returns that admits a location-scale model. Where the location (mean) function and
scale (variance) function are smooth, the error term is unknown and assumed to be uncorrelated
to the independent variable (lagged returns). The prediction bands yield a relatively small width,
indicating good performance as depicted in the literature. Hence, the prediction bands are good
especially when the returns are assumed to have a location-scale model. | en_US |
