Abstract
AbstractThe prominence of the Euler allocation rule (EAR) is rooted in the fact that it is the only return on risk-adjusted capital (RORAC) compatible capital allocation rule. When the total regulatory capital is set using the value-at-risk (VaR), the EAR becomes – using a statistical term – the quantile-regression (QR) function. Although the cumulative QR function (i.e., an integral of the QR function) has received considerable attention in the literature, a fully developed statistical inference theory for the QR function itself has been elusive. In the present paper, we develop such a theory based on an empirical QR estimator, for which we establish consistency, asymptotic normality, and standard error estimation. This makes the herein developed results readily applicable in practice, thus facilitating decision making within the RORAC paradigm, conditional mean risk sharing, and current regulatory frameworks.
Publisher
Cambridge University Press (CUP)
Subject
Economics and Econometrics,Finance,Accounting
Reference40 articles.
1. EIOPA (2016) Solvency II. The European Insurance and Occupational Pensions Authority, Frankfurt am Main.
2. BCBS (2019). Minimum Capital Requirements for Market Risk. February 2019. Basel Committee on Banking Supervision. Bank for International Settlements, Basel.
3. An Introduction to Statistical Learning
4. Empirical tail conditional allocation and its consistency under minimal assumptions