The debate of what quantitative risk measure to choose in practice has mainly focused on the dichotomy between Value at Risk (VaR) -- a quantile -- and Expected Shortfall (ES) -- a tail expectation. Range Value at Risk (RVaR) is a natural interpolation between these two prominent risk measures, which constitutes a tradeoff between the sensitivity of the latter and the robustness of the former, turning it into a practically relevant risk measure on its own. As such, there is a need to statistically validate RVaR forecasts and to compare and rank the performance of different RVaR models, tasks subsumed under the term 'backtesting' in finance. The predictive performance is best evaluated and compared in terms of strictly consistent loss or scoring functions. That is, functions which are minimised in expectation by the correct RVaR forecast. Much like ES, it has been shown recently that RVaR does not admit strictly consistent scoring functions, i.e., it is not elicitable. Mitigating this negative result, this paper shows that a triplet of RVaR with two VaR components at different levels is elicitable. We characterise the class of strictly consistent scoring functions for this triplet. Additional properties of these scoring functions are examined, including the diagnostic tool of Murphy diagrams. The results are illustrated with a simulation study, and we put our approach in perspective with respect to the classical approach of trimmed least squares in robust regression.
翻译:关于在实践中选择何种量化风险措施的辩论,主要侧重于风险价值(VaR) -- -- 量化 -- -- 和预期短限(ES) -- -- 尾端预期。风险值(RVAR)是这两种突出风险措施之间自然的相互权衡,这构成了后者敏感度与前者稳健度之间的权衡,使前者本身变成一个实际相关的风险衡量标准。因此,需要从统计上验证RVAR预测,比较不同RVAR模型的性能和评级,这些模型在金融中包含“后测试”一词下的任务。预测性业绩得到最好的评估,并以严格一致的损失或评分功能进行比较。这是根据正确的RVaR预测而减少的功能。与ES一样,最近显示RVaR并不承认严格一致的评分功能,也就是说,这是无法令人理解的。 本文显示,具有两个最低风险值的RVaR模型在金融层面的性能和两个最低值的性能。 我们的性能性能被严格地按照正确的RVAR预测性能进行,包括三角结构分析。
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