Résumé
Risk measures of a financial position are traditionally based on quantiles. Replacing quantiles with their least squares analogues, called expectiles, has recently received increasing attention. The novel expectile-based risk measures satisfy all coherence requirements. We revisit their extreme value estimation for heavy-tailed distributions. First, we estimate the underlying tail index via weighted combinations of top order statistics and asymmetric least squares estimates. The resulting expectHill estimators are then used as the basis for estimating tail expectiles and Expected Shortfall. The asymptotic theory of the proposed estimators is provided, along with numerical simulations and applications to actuarial and financial data.
Mots-clés
Asymmetric least squares; Coherent risk measures; Expected shortfall; Expectile; Extrapolation; Extremes; Heavy tails; Tail index;
Codes JEL
- C13: Estimation: General
- C14: Semiparametric and Nonparametric Methods: General
Remplacé par
Abdelaati Daouia, Stéphane Girard et Gilles Stupfler, « ExpectHill estimation, extreme risk and heavy tails », Journal of Econometrics, vol. 221, n° 1, mars 2021, p. 97–117.
Référence
Abdelaati Daouia, Stéphane Girard et Gilles Stupfler, « ExpectHill estimation, extreme risk and heavy tails », TSE Working Paper, n° 18-953, septembre 2018.
Voir aussi
Publié dans
TSE Working Paper, n° 18-953, septembre 2018