Upper Comonotonicity and Risk Aggregation under Dependence Uncertainty

arXiv - QuantFin - Risk Management Pub Date : 2024-06-27 DOI:arxiv-2406.19242

Corrado De Vecchi, Max Nendel, Jan Streicher

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Abstract

In this paper, we study dependence uncertainty and the resulting effects on tail risk measures, which play a fundamental role in modern risk management. We introduce the notion of a regular dependence measure, defined on multi-marginal couplings, as a generalization of well-known correlation statistics such as the Pearson correlation. The first main result states that even an arbitrarily small positive dependence between losses can result in perfectly correlated tails beyond a certain threshold and seemingly complete independence before this threshold. In a second step, we focus on the aggregation of individual risks with known marginal distributions by means of arbitrary nondecreasing left-continuous aggregation functions. In this context, we show that under an arbitrarily small positive dependence, the tail risk of the aggregate loss might coincide with the one of perfectly correlated losses. A similar result is derived for expectiles under mild conditions. In a last step, we discuss our results in the context of credit risk, analyzing the potential effects on the value at risk for weighted sums of Bernoulli distributed losses.

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依赖性不确定性下的上协整性和风险聚合

本文研究了依赖性不确定性及其对尾风险度量的影响，尾风险度量在现代风险管理中发挥着重要作用。我们引入了定义在多边际耦合上的正则依赖性度量的概念，将其作为著名的相关统计量（如皮尔森相关性）的一般化。第一个主要结果表明，即使损失之间存在任意小的正相关性，也会导致超过一定阈值后的完全相关性，而在此阈值之前则看似完全独立。第二步，我们将重点放在通过任意非递减左连续聚合函数聚合已知边际分布的单个风险上。在这种情况下，我们证明了在任意小的正相关性下，总体损失的尾部风险可能与完全相关损失的尾部风险相吻合。在温和的条件下，也可以得出类似的结果。最后，我们以信用风险为背景讨论了我们的结果，分析了伯努利分布式损失加权和对风险值的潜在影响。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - QuantFin - Risk Management

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